Created
December 22, 2019 22:55
-
-
Save kbuzzard/aa3de5382b956ab9306dc8ec65f47cba to your computer and use it in GitHub Desktop.
bad instance trace
This file contains bidirectional Unicode text that may be interpreted or compiled differently than what appears below. To review, open the file in an editor that reveals hidden Unicode characters.
Learn more about bidirectional Unicode characters
| [class_instances] class-instance resolution trace | |
| [class_instances] (0) ?x_0 : has_mul G := @ideal.has_mul ?x_1 ?x_2 | |
| failed is_def_eq | |
| [class_instances] (0) ?x_0 : has_mul G := @submodule.has_mul ?x_3 ?x_4 ?x_5 ?x_6 ?x_7 | |
| failed is_def_eq | |
| [class_instances] (0) ?x_0 : has_mul G := @matrix.has_mul ?x_8 ?x_9 ?x_10 ?x_11 ?x_12 | |
| failed is_def_eq | |
| [class_instances] (0) ?x_0 : has_mul G := complex.has_mul | |
| failed is_def_eq | |
| [class_instances] (0) ?x_0 : has_mul G := snum.has_mul | |
| failed is_def_eq | |
| [class_instances] (0) ?x_0 : has_mul G := znum.has_mul | |
| failed is_def_eq | |
| [class_instances] (0) ?x_0 : has_mul G := num.has_mul | |
| failed is_def_eq | |
| [class_instances] (0) ?x_0 : has_mul G := pos_num.has_mul | |
| failed is_def_eq | |
| [class_instances] (0) ?x_0 : has_mul G := @bitvec.has_mul ?x_13 | |
| failed is_def_eq | |
| [class_instances] (0) ?x_0 : has_mul G := @cau_seq.completion.has_mul ?x_14 ?x_15 ?x_16 ?x_17 ?x_18 ?x_19 | |
| failed is_def_eq | |
| [class_instances] (0) ?x_0 : has_mul G := @cau_seq.has_mul ?x_20 ?x_21 ?x_22 ?x_23 ?x_24 ?x_25 | |
| failed is_def_eq | |
| [class_instances] (0) ?x_0 : has_mul G := @mv_polynomial.has_mul ?x_26 ?x_27 ?x_28 | |
| failed is_def_eq | |
| [class_instances] (0) ?x_0 : has_mul G := @polynomial.has_mul ?x_29 ?x_30 | |
| failed is_def_eq | |
| [class_instances] (0) ?x_0 : has_mul G := @free_group.has_mul ?x_31 | |
| failed is_def_eq | |
| [class_instances] (0) ?x_0 : has_mul G := @ideal.quotient.has_mul ?x_32 ?x_33 ?x_34 | |
| failed is_def_eq | |
| [class_instances] (0) ?x_0 : has_mul G := @associates.has_mul ?x_35 ?x_36 | |
| failed is_def_eq | |
| [class_instances] (0) ?x_0 : has_mul G := @linear_map.has_mul ?x_37 ?x_38 ?x_39 ?x_40 ?x_41 | |
| failed is_def_eq | |
| [class_instances] (0) ?x_0 : has_mul G := @finsupp.has_mul ?x_42 ?x_43 ?x_44 ?x_45 | |
| failed is_def_eq | |
| [class_instances] (0) ?x_0 : has_mul G := @prod.has_mul ?x_46 ?x_47 ?x_48 ?x_49 | |
| failed is_def_eq | |
| [class_instances] (0) ?x_0 : has_mul G := @pi.has_mul ?x_50 ?x_51 ?x_52 | |
| failed is_def_eq | |
| [class_instances] (0) ?x_0 : has_mul G := @submonoid.has_mul ?x_53 ?x_54 ?x_55 | |
| failed is_def_eq | |
| [class_instances] (0) ?x_0 : has_mul G := rat.has_mul | |
| failed is_def_eq | |
| [class_instances] (0) ?x_0 : has_mul G := @with_one.has_mul ?x_56 ?x_57 | |
| failed is_def_eq | |
| [class_instances] (0) ?x_0 : has_mul G := @multiplicative.has_mul ?x_58 ?x_59 | |
| failed is_def_eq | |
| [class_instances] (0) ?x_0 : has_mul G := @monoid_hom.has_mul ?x_60 ?x_61 ?x_62 ?x_63 | |
| failed is_def_eq | |
| [class_instances] (0) ?x_0 : has_mul G := @units.has_mul ?x_64 ?x_65 | |
| failed is_def_eq | |
| [class_instances] (0) ?x_0 : has_mul G := unsigned.has_mul | |
| failed is_def_eq | |
| [class_instances] (0) ?x_0 : has_mul G := @fin.has_mul ?x_66 | |
| failed is_def_eq | |
| [class_instances] (0) ?x_0 : has_mul G := int.has_mul | |
| failed is_def_eq | |
| [class_instances] (0) ?x_0 : has_mul G := nat.has_mul | |
| failed is_def_eq | |
| [class_instances] (0) ?x_0 : has_mul G := @no_zero_divisors.to_has_mul ?x_67 ?x_68 | |
| [class_instances] (1) ?x_68 : no_zero_divisors G := @domain.to_no_zero_divisors ?x_69 ?x_70 | |
| [class_instances] (2) ?x_70 : domain G := real.domain | |
| failed is_def_eq | |
| [class_instances] (2) ?x_70 : domain G := @division_ring.to_domain ?x_71 ?x_72 | |
| [class_instances] (3) ?x_72 : division_ring G := real.division_ring | |
| failed is_def_eq | |
| [class_instances] (3) ?x_72 : division_ring G := rat.division_ring | |
| failed is_def_eq | |
| [class_instances] (3) ?x_72 : division_ring G := @field.to_division_ring ?x_73 ?x_74 | |
| [class_instances] (4) ?x_74 : field G := real.field | |
| failed is_def_eq | |
| [class_instances] (4) ?x_74 : field G := rat.field | |
| failed is_def_eq | |
| [class_instances] (4) ?x_74 : field G := @linear_ordered_field.to_field ?x_75 ?x_76 | |
| [class_instances] (5) ?x_76 : linear_ordered_field G := real.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (5) ?x_76 : linear_ordered_field G := rat.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (5) ?x_76 : linear_ordered_field G := @discrete_linear_ordered_field.to_linear_ordered_field ?x_77 ?x_78 | |
| [class_instances] (6) ?x_78 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (6) ?x_78 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (4) ?x_74 : field G := @discrete_field.to_field ?x_75 ?x_76 | |
| [class_instances] (5) ?x_76 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (5) ?x_76 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (5) ?x_76 : discrete_field G := @local_ring.residue_field.discrete_field ?x_77 ?x_78 | |
| failed is_def_eq | |
| [class_instances] (5) ?x_76 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (5) ?x_76 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_79 ?x_80 | |
| [class_instances] (6) ?x_80 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (6) ?x_80 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (2) ?x_70 : domain G := @linear_nonneg_ring.to_domain ?x_71 ?x_72 | |
| [class_instances] (2) ?x_70 : domain G := @linear_ordered_ring.to_domain ?x_71 ?x_72 | |
| [class_instances] (3) ?x_72 : linear_ordered_ring G := real.linear_ordered_ring | |
| failed is_def_eq | |
| [class_instances] (3) ?x_72 : linear_ordered_ring G := rat.linear_ordered_ring | |
| failed is_def_eq | |
| [class_instances] (3) ?x_72 : linear_ordered_ring G := @linear_ordered_field.to_linear_ordered_ring ?x_73 ?x_74 | |
| [class_instances] (4) ?x_74 : linear_ordered_field G := real.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (4) ?x_74 : linear_ordered_field G := rat.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (4) ?x_74 : linear_ordered_field G := @discrete_linear_ordered_field.to_linear_ordered_field ?x_75 ?x_76 | |
| [class_instances] (5) ?x_76 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (5) ?x_76 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (3) ?x_72 : linear_ordered_ring G := @linear_nonneg_ring.to_linear_ordered_ring ?x_73 ?x_74 | |
| [class_instances] (3) ?x_72 : linear_ordered_ring G := @linear_ordered_comm_ring.to_linear_ordered_ring ?x_73 ?x_74 | |
| [class_instances] (4) ?x_74 : linear_ordered_comm_ring G := real.linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (4) ?x_74 : linear_ordered_comm_ring G := rat.linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (4) ?x_74 : linear_ordered_comm_ring G := @decidable_linear_ordered_comm_ring.to_linear_ordered_comm_ring ?x_75 ?x_76 | |
| [class_instances] (5) ?x_76 : decidable_linear_ordered_comm_ring G := real.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (5) ?x_76 : decidable_linear_ordered_comm_ring G := rat.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (5) ?x_76 : decidable_linear_ordered_comm_ring G := int.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (5) ?x_76 : decidable_linear_ordered_comm_ring G := @discrete_linear_ordered_field.to_decidable_linear_ordered_comm_ring ?x_77 ?x_78 | |
| [class_instances] (6) ?x_78 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (6) ?x_78 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (5) ?x_76 : decidable_linear_ordered_comm_ring G := @linear_nonneg_ring.to_decidable_linear_ordered_comm_ring ?x_77 ?x_78 ?x_79 ?x_80 | |
| [class_instances] (2) ?x_70 : domain G := @integral_domain.to_domain ?x_71 ?x_72 | |
| [class_instances] (3) ?x_72 : integral_domain G := real.integral_domain | |
| failed is_def_eq | |
| [class_instances] (3) ?x_72 : integral_domain G := @polynomial.integral_domain ?x_73 ?x_74 | |
| failed is_def_eq | |
| [class_instances] (3) ?x_72 : integral_domain G := @ideal.quotient.integral_domain ?x_75 ?x_76 ?x_77 ?x_78 | |
| failed is_def_eq | |
| [class_instances] (3) ?x_72 : integral_domain G := @subring.domain ?x_79 ?x_80 ?x_81 ?x_82 | |
| failed is_def_eq | |
| [class_instances] (3) ?x_72 : integral_domain G := rat.integral_domain | |
| failed is_def_eq | |
| [class_instances] (3) ?x_72 : integral_domain G := @principal_ideal_domain.to_integral_domain ?x_83 ?x_84 | |
| [class_instances] (4) ?x_84 : principal_ideal_domain G := @euclidean_domain.to_principal_ideal_domain ?x_85 ?x_86 | |
| [class_instances] (5) ?x_86 : euclidean_domain G := @polynomial.euclidean_domain ?x_87 ?x_88 | |
| failed is_def_eq | |
| [class_instances] (5) ?x_86 : euclidean_domain G := int.euclidean_domain | |
| failed is_def_eq | |
| [class_instances] (5) ?x_86 : euclidean_domain G := @discrete_field.to_euclidean_domain ?x_89 ?x_90 | |
| [class_instances] (6) ?x_90 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (6) ?x_90 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (6) ?x_90 : discrete_field G := @local_ring.residue_field.discrete_field ?x_91 ?x_92 | |
| failed is_def_eq | |
| [class_instances] (6) ?x_90 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (6) ?x_90 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_93 ?x_94 | |
| [class_instances] (7) ?x_94 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (7) ?x_94 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (3) ?x_72 : integral_domain G := @euclidean_domain.integral_domain ?x_73 ?x_74 | |
| [class_instances] (4) ?x_74 : euclidean_domain G := @polynomial.euclidean_domain ?x_75 ?x_76 | |
| failed is_def_eq | |
| [class_instances] (4) ?x_74 : euclidean_domain G := int.euclidean_domain | |
| failed is_def_eq | |
| [class_instances] (4) ?x_74 : euclidean_domain G := @discrete_field.to_euclidean_domain ?x_77 ?x_78 | |
| [class_instances] (5) ?x_78 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (5) ?x_78 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (5) ?x_78 : discrete_field G := @local_ring.residue_field.discrete_field ?x_79 ?x_80 | |
| failed is_def_eq | |
| [class_instances] (5) ?x_78 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (5) ?x_78 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_81 ?x_82 | |
| [class_instances] (6) ?x_82 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (6) ?x_82 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (3) ?x_72 : integral_domain G := @normalization_domain.to_integral_domain ?x_73 ?x_74 | |
| [class_instances] (4) ?x_74 : normalization_domain G := @polynomial.normalization_domain ?x_75 ?x_76 | |
| failed is_def_eq | |
| [class_instances] (4) ?x_74 : normalization_domain G := int.normalization_domain | |
| failed is_def_eq | |
| [class_instances] (4) ?x_74 : normalization_domain G := @gcd_domain.to_normalization_domain ?x_77 ?x_78 | |
| [class_instances] (5) ?x_78 : gcd_domain G := int.gcd_domain | |
| failed is_def_eq | |
| [class_instances] (3) ?x_72 : integral_domain G := @field.to_integral_domain ?x_73 ?x_74 | |
| [class_instances] (4) ?x_74 : field G := real.field | |
| failed is_def_eq | |
| [class_instances] (4) ?x_74 : field G := rat.field | |
| failed is_def_eq | |
| [class_instances] (4) ?x_74 : field G := @linear_ordered_field.to_field ?x_75 ?x_76 | |
| [class_instances] (5) ?x_76 : linear_ordered_field G := real.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (5) ?x_76 : linear_ordered_field G := rat.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (5) ?x_76 : linear_ordered_field G := @discrete_linear_ordered_field.to_linear_ordered_field ?x_77 ?x_78 | |
| [class_instances] (6) ?x_78 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (6) ?x_78 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (4) ?x_74 : field G := @discrete_field.to_field ?x_75 ?x_76 | |
| [class_instances] (5) ?x_76 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (5) ?x_76 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (5) ?x_76 : discrete_field G := @local_ring.residue_field.discrete_field ?x_77 ?x_78 | |
| failed is_def_eq | |
| [class_instances] (5) ?x_76 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (5) ?x_76 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_79 ?x_80 | |
| [class_instances] (6) ?x_80 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (6) ?x_80 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (3) ?x_72 : integral_domain G := @discrete_field.to_integral_domain ?x_73 ?x_74 ?x_75 | |
| [class_instances] (4) ?x_74 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (4) ?x_74 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (4) ?x_74 : discrete_field G := @local_ring.residue_field.discrete_field ?x_76 ?x_77 | |
| failed is_def_eq | |
| [class_instances] (4) ?x_74 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (4) ?x_74 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_78 ?x_79 | |
| [class_instances] (5) ?x_79 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (5) ?x_79 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (3) ?x_72 : integral_domain G := @linear_ordered_comm_ring.to_integral_domain ?x_73 ?x_74 | |
| [class_instances] (4) ?x_74 : linear_ordered_comm_ring G := real.linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (4) ?x_74 : linear_ordered_comm_ring G := rat.linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (4) ?x_74 : linear_ordered_comm_ring G := @decidable_linear_ordered_comm_ring.to_linear_ordered_comm_ring ?x_75 ?x_76 | |
| [class_instances] (5) ?x_76 : decidable_linear_ordered_comm_ring G := real.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (5) ?x_76 : decidable_linear_ordered_comm_ring G := rat.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (5) ?x_76 : decidable_linear_ordered_comm_ring G := int.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (5) ?x_76 : decidable_linear_ordered_comm_ring G := @discrete_linear_ordered_field.to_decidable_linear_ordered_comm_ring ?x_77 ?x_78 | |
| [class_instances] (6) ?x_78 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (6) ?x_78 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (5) ?x_76 : decidable_linear_ordered_comm_ring G := @linear_nonneg_ring.to_decidable_linear_ordered_comm_ring ?x_77 ?x_78 ?x_79 ?x_80 | |
| [class_instances] (1) ?x_68 : no_zero_divisors G := @integral_domain.to_no_zero_divisors ?x_69 ?x_70 | |
| [class_instances] (2) ?x_70 : integral_domain G := real.integral_domain | |
| failed is_def_eq | |
| [class_instances] (2) ?x_70 : integral_domain G := @polynomial.integral_domain ?x_71 ?x_72 | |
| failed is_def_eq | |
| [class_instances] (2) ?x_70 : integral_domain G := @ideal.quotient.integral_domain ?x_73 ?x_74 ?x_75 ?x_76 | |
| failed is_def_eq | |
| [class_instances] (2) ?x_70 : integral_domain G := @subring.domain ?x_77 ?x_78 ?x_79 ?x_80 | |
| failed is_def_eq | |
| [class_instances] (2) ?x_70 : integral_domain G := rat.integral_domain | |
| failed is_def_eq | |
| [class_instances] (2) ?x_70 : integral_domain G := @principal_ideal_domain.to_integral_domain ?x_81 ?x_82 | |
| [class_instances] (3) ?x_82 : principal_ideal_domain G := @euclidean_domain.to_principal_ideal_domain ?x_83 ?x_84 | |
| [class_instances] (4) ?x_84 : euclidean_domain G := @polynomial.euclidean_domain ?x_85 ?x_86 | |
| failed is_def_eq | |
| [class_instances] (4) ?x_84 : euclidean_domain G := int.euclidean_domain | |
| failed is_def_eq | |
| [class_instances] (4) ?x_84 : euclidean_domain G := @discrete_field.to_euclidean_domain ?x_87 ?x_88 | |
| [class_instances] (5) ?x_88 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (5) ?x_88 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (5) ?x_88 : discrete_field G := @local_ring.residue_field.discrete_field ?x_89 ?x_90 | |
| failed is_def_eq | |
| [class_instances] (5) ?x_88 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (5) ?x_88 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_91 ?x_92 | |
| [class_instances] (6) ?x_92 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (6) ?x_92 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (2) ?x_70 : integral_domain G := @euclidean_domain.integral_domain ?x_71 ?x_72 | |
| [class_instances] (3) ?x_72 : euclidean_domain G := @polynomial.euclidean_domain ?x_73 ?x_74 | |
| failed is_def_eq | |
| [class_instances] (3) ?x_72 : euclidean_domain G := int.euclidean_domain | |
| failed is_def_eq | |
| [class_instances] (3) ?x_72 : euclidean_domain G := @discrete_field.to_euclidean_domain ?x_75 ?x_76 | |
| [class_instances] (4) ?x_76 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (4) ?x_76 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (4) ?x_76 : discrete_field G := @local_ring.residue_field.discrete_field ?x_77 ?x_78 | |
| failed is_def_eq | |
| [class_instances] (4) ?x_76 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (4) ?x_76 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_79 ?x_80 | |
| [class_instances] (5) ?x_80 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (5) ?x_80 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (2) ?x_70 : integral_domain G := @normalization_domain.to_integral_domain ?x_71 ?x_72 | |
| [class_instances] (3) ?x_72 : normalization_domain G := @polynomial.normalization_domain ?x_73 ?x_74 | |
| failed is_def_eq | |
| [class_instances] (3) ?x_72 : normalization_domain G := int.normalization_domain | |
| failed is_def_eq | |
| [class_instances] (3) ?x_72 : normalization_domain G := @gcd_domain.to_normalization_domain ?x_75 ?x_76 | |
| [class_instances] (4) ?x_76 : gcd_domain G := int.gcd_domain | |
| failed is_def_eq | |
| [class_instances] (2) ?x_70 : integral_domain G := @field.to_integral_domain ?x_71 ?x_72 | |
| [class_instances] (3) ?x_72 : field G := real.field | |
| failed is_def_eq | |
| [class_instances] (3) ?x_72 : field G := rat.field | |
| failed is_def_eq | |
| [class_instances] (3) ?x_72 : field G := @linear_ordered_field.to_field ?x_73 ?x_74 | |
| [class_instances] (4) ?x_74 : linear_ordered_field G := real.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (4) ?x_74 : linear_ordered_field G := rat.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (4) ?x_74 : linear_ordered_field G := @discrete_linear_ordered_field.to_linear_ordered_field ?x_75 ?x_76 | |
| [class_instances] (5) ?x_76 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (5) ?x_76 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (3) ?x_72 : field G := @discrete_field.to_field ?x_73 ?x_74 | |
| [class_instances] (4) ?x_74 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (4) ?x_74 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (4) ?x_74 : discrete_field G := @local_ring.residue_field.discrete_field ?x_75 ?x_76 | |
| failed is_def_eq | |
| [class_instances] (4) ?x_74 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (4) ?x_74 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_77 ?x_78 | |
| [class_instances] (5) ?x_78 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (5) ?x_78 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (2) ?x_70 : integral_domain G := @discrete_field.to_integral_domain ?x_71 ?x_72 ?x_73 | |
| [class_instances] (3) ?x_72 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (3) ?x_72 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (3) ?x_72 : discrete_field G := @local_ring.residue_field.discrete_field ?x_74 ?x_75 | |
| failed is_def_eq | |
| [class_instances] (3) ?x_72 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (3) ?x_72 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_76 ?x_77 | |
| [class_instances] (4) ?x_77 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (4) ?x_77 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (2) ?x_70 : integral_domain G := @linear_ordered_comm_ring.to_integral_domain ?x_71 ?x_72 | |
| [class_instances] (3) ?x_72 : linear_ordered_comm_ring G := real.linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (3) ?x_72 : linear_ordered_comm_ring G := rat.linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (3) ?x_72 : linear_ordered_comm_ring G := @decidable_linear_ordered_comm_ring.to_linear_ordered_comm_ring ?x_73 ?x_74 | |
| [class_instances] (4) ?x_74 : decidable_linear_ordered_comm_ring G := real.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (4) ?x_74 : decidable_linear_ordered_comm_ring G := rat.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (4) ?x_74 : decidable_linear_ordered_comm_ring G := int.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (4) ?x_74 : decidable_linear_ordered_comm_ring G := @discrete_linear_ordered_field.to_decidable_linear_ordered_comm_ring ?x_75 ?x_76 | |
| [class_instances] (5) ?x_76 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (5) ?x_76 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (4) ?x_74 : decidable_linear_ordered_comm_ring G := @linear_nonneg_ring.to_decidable_linear_ordered_comm_ring ?x_75 ?x_76 ?x_77 ?x_78 | |
| [class_instances] (0) ?x_0 : has_mul G := @mul_zero_class.to_has_mul ?x_1 ?x_2 | |
| [class_instances] (1) ?x_2 : mul_zero_class G := @with_top.mul_zero_class ?x_3 ?x_4 ?x_5 | |
| failed is_def_eq | |
| [class_instances] (1) ?x_2 : mul_zero_class G := @with_zero.mul_zero_class ?x_6 ?x_7 | |
| failed is_def_eq | |
| [class_instances] (1) ?x_2 : mul_zero_class G := @semiring.to_mul_zero_class ?x_8 ?x_9 | |
| [class_instances] (2) ?x_9 : semiring G := @submodule.semiring ?x_10 ?x_11 ?x_12 ?x_13 ?x_14 | |
| failed is_def_eq | |
| [class_instances] (2) ?x_9 : semiring G := @matrix.semiring ?x_15 ?x_16 ?x_17 ?x_18 ?x_19 | |
| failed is_def_eq | |
| [class_instances] (2) ?x_9 : semiring G := real.semiring | |
| failed is_def_eq | |
| [class_instances] (2) ?x_9 : semiring G := @finsupp.semiring ?x_20 ?x_21 ?x_22 ?x_23 | |
| failed is_def_eq | |
| [class_instances] (2) ?x_9 : semiring G := @prod.semiring ?x_24 ?x_25 ?x_26 ?x_27 | |
| failed is_def_eq | |
| [class_instances] (2) ?x_9 : semiring G := rat.semiring | |
| failed is_def_eq | |
| [class_instances] (2) ?x_9 : semiring G := @with_zero.semiring ?x_28 ?x_29 | |
| failed is_def_eq | |
| [class_instances] (2) ?x_9 : semiring G := int.semiring | |
| failed is_def_eq | |
| [class_instances] (2) ?x_9 : semiring G := nat.semiring | |
| failed is_def_eq | |
| [class_instances] (2) ?x_9 : semiring G := @ordered_semiring.to_semiring ?x_30 ?x_31 | |
| [class_instances] (3) ?x_31 : ordered_semiring G := real.ordered_semiring | |
| failed is_def_eq | |
| [class_instances] (3) ?x_31 : ordered_semiring G := rat.ordered_semiring | |
| failed is_def_eq | |
| [class_instances] (3) ?x_31 : ordered_semiring G := nat.ordered_semiring | |
| failed is_def_eq | |
| [class_instances] (3) ?x_31 : ordered_semiring G := @ordered_ring.to_ordered_semiring ?x_32 ?x_33 | |
| [class_instances] (4) ?x_33 : ordered_ring G := real.ordered_ring | |
| failed is_def_eq | |
| [class_instances] (4) ?x_33 : ordered_ring G := rat.ordered_ring | |
| failed is_def_eq | |
| [class_instances] (4) ?x_33 : ordered_ring G := @nonneg_ring.to_ordered_ring ?x_34 ?x_35 | |
| [class_instances] (5) ?x_35 : nonneg_ring G := @linear_nonneg_ring.to_nonneg_ring ?x_36 ?x_37 | |
| [class_instances] (4) ?x_33 : ordered_ring G := @linear_ordered_ring.to_ordered_ring ?x_34 ?x_35 | |
| [class_instances] (5) ?x_35 : linear_ordered_ring G := real.linear_ordered_ring | |
| failed is_def_eq | |
| [class_instances] (5) ?x_35 : linear_ordered_ring G := rat.linear_ordered_ring | |
| failed is_def_eq | |
| [class_instances] (5) ?x_35 : linear_ordered_ring G := @linear_ordered_field.to_linear_ordered_ring ?x_36 ?x_37 | |
| [class_instances] (6) ?x_37 : linear_ordered_field G := real.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (6) ?x_37 : linear_ordered_field G := rat.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (6) ?x_37 : linear_ordered_field G := @discrete_linear_ordered_field.to_linear_ordered_field ?x_38 ?x_39 | |
| [class_instances] (7) ?x_39 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (7) ?x_39 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (5) ?x_35 : linear_ordered_ring G := @linear_nonneg_ring.to_linear_ordered_ring ?x_36 ?x_37 | |
| [class_instances] (5) ?x_35 : linear_ordered_ring G := @linear_ordered_comm_ring.to_linear_ordered_ring ?x_36 ?x_37 | |
| [class_instances] (6) ?x_37 : linear_ordered_comm_ring G := real.linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (6) ?x_37 : linear_ordered_comm_ring G := rat.linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (6) ?x_37 : linear_ordered_comm_ring G := @decidable_linear_ordered_comm_ring.to_linear_ordered_comm_ring ?x_38 ?x_39 | |
| [class_instances] (7) ?x_39 : decidable_linear_ordered_comm_ring G := real.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (7) ?x_39 : decidable_linear_ordered_comm_ring G := rat.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (7) ?x_39 : decidable_linear_ordered_comm_ring G := int.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (7) ?x_39 : decidable_linear_ordered_comm_ring G := @discrete_linear_ordered_field.to_decidable_linear_ordered_comm_ring ?x_40 ?x_41 | |
| [class_instances] (8) ?x_41 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (8) ?x_41 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (7) ?x_39 : decidable_linear_ordered_comm_ring G := @linear_nonneg_ring.to_decidable_linear_ordered_comm_ring ?x_40 ?x_41 ?x_42 ?x_43 | |
| [class_instances] (3) ?x_31 : ordered_semiring G := @linear_ordered_semiring.to_ordered_semiring ?x_32 ?x_33 | |
| [class_instances] (4) ?x_33 : linear_ordered_semiring G := real.linear_ordered_semiring | |
| failed is_def_eq | |
| [class_instances] (4) ?x_33 : linear_ordered_semiring G := rat.linear_ordered_semiring | |
| failed is_def_eq | |
| [class_instances] (4) ?x_33 : linear_ordered_semiring G := @linear_ordered_ring.to_linear_ordered_semiring ?x_34 ?x_35 | |
| [class_instances] (5) ?x_35 : linear_ordered_ring G := real.linear_ordered_ring | |
| failed is_def_eq | |
| [class_instances] (5) ?x_35 : linear_ordered_ring G := rat.linear_ordered_ring | |
| failed is_def_eq | |
| [class_instances] (5) ?x_35 : linear_ordered_ring G := @linear_ordered_field.to_linear_ordered_ring ?x_36 ?x_37 | |
| [class_instances] (6) ?x_37 : linear_ordered_field G := real.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (6) ?x_37 : linear_ordered_field G := rat.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (6) ?x_37 : linear_ordered_field G := @discrete_linear_ordered_field.to_linear_ordered_field ?x_38 ?x_39 | |
| [class_instances] (7) ?x_39 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (7) ?x_39 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (5) ?x_35 : linear_ordered_ring G := @linear_nonneg_ring.to_linear_ordered_ring ?x_36 ?x_37 | |
| [class_instances] (5) ?x_35 : linear_ordered_ring G := @linear_ordered_comm_ring.to_linear_ordered_ring ?x_36 ?x_37 | |
| [class_instances] (6) ?x_37 : linear_ordered_comm_ring G := real.linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (6) ?x_37 : linear_ordered_comm_ring G := rat.linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (6) ?x_37 : linear_ordered_comm_ring G := @decidable_linear_ordered_comm_ring.to_linear_ordered_comm_ring ?x_38 ?x_39 | |
| [class_instances] (7) ?x_39 : decidable_linear_ordered_comm_ring G := real.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (7) ?x_39 : decidable_linear_ordered_comm_ring G := rat.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (7) ?x_39 : decidable_linear_ordered_comm_ring G := int.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (7) ?x_39 : decidable_linear_ordered_comm_ring G := @discrete_linear_ordered_field.to_decidable_linear_ordered_comm_ring ?x_40 ?x_41 | |
| [class_instances] (8) ?x_41 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (8) ?x_41 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (7) ?x_39 : decidable_linear_ordered_comm_ring G := @linear_nonneg_ring.to_decidable_linear_ordered_comm_ring ?x_40 ?x_41 ?x_42 ?x_43 | |
| [class_instances] (4) ?x_33 : linear_ordered_semiring G := @decidable_linear_ordered_semiring.to_linear_ordered_semiring ?x_34 ?x_35 | |
| [class_instances] (5) ?x_35 : decidable_linear_ordered_semiring G := real.decidable_linear_ordered_semiring | |
| failed is_def_eq | |
| [class_instances] (5) ?x_35 : decidable_linear_ordered_semiring G := rat.decidable_linear_ordered_semiring | |
| failed is_def_eq | |
| [class_instances] (5) ?x_35 : decidable_linear_ordered_semiring G := nat.decidable_linear_ordered_semiring | |
| failed is_def_eq | |
| [class_instances] (5) ?x_35 : decidable_linear_ordered_semiring G := @decidable_linear_ordered_comm_ring.to_decidable_linear_ordered_semiring ?x_36 ?x_37 | |
| [class_instances] (6) ?x_37 : decidable_linear_ordered_comm_ring G := real.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (6) ?x_37 : decidable_linear_ordered_comm_ring G := rat.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (6) ?x_37 : decidable_linear_ordered_comm_ring G := int.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (6) ?x_37 : decidable_linear_ordered_comm_ring G := @discrete_linear_ordered_field.to_decidable_linear_ordered_comm_ring ?x_38 ?x_39 | |
| [class_instances] (7) ?x_39 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (7) ?x_39 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (6) ?x_37 : decidable_linear_ordered_comm_ring G := @linear_nonneg_ring.to_decidable_linear_ordered_comm_ring ?x_38 ?x_39 ?x_40 ?x_41 | |
| [class_instances] (2) ?x_9 : semiring G := @ring.to_semiring ?x_10 ?x_11 | |
| [class_instances] (3) ?x_11 : ring G := @ @reversible.to_ring ?x_12 ?x_13 | |
| [class_instances] (4) ?x_13 : _root_.reversible G := @ @_root_.reversible_of_comm_ring ?x_14 ?x_15 | |
| [class_instances] (5) ?x_15 : comm_ring G := @subalgebra.comm_ring ?x_16 ?x_17 ?x_18 ?x_19 ?x_20 ?x_21 | |
| failed is_def_eq | |
| [class_instances] (5) ?x_15 : comm_ring G := @algebra.comap.comm_ring ?x_22 ?x_23 ?x_24 ?x_25 ?x_26 ?x_27 ?x_28 ?x_29 | |
| failed is_def_eq | |
| [class_instances] (5) ?x_15 : comm_ring G := complex.comm_ring | |
| failed is_def_eq | |
| [class_instances] (5) ?x_15 : comm_ring G := real.comm_ring | |
| failed is_def_eq | |
| [class_instances] (5) ?x_15 : comm_ring G := @cau_seq.completion.comm_ring ?x_30 ?x_31 ?x_32 ?x_33 ?x_34 ?x_35 | |
| failed is_def_eq | |
| [class_instances] (5) ?x_15 : comm_ring G := @cau_seq.comm_ring ?x_36 ?x_37 ?x_38 ?x_39 ?x_40 ?x_41 | |
| failed is_def_eq | |
| [class_instances] (5) ?x_15 : comm_ring G := @mv_polynomial.comm_ring ?x_42 ?x_43 ?x_44 | |
| failed is_def_eq | |
| [class_instances] (5) ?x_15 : comm_ring G := @polynomial.comm_ring ?x_45 ?x_46 | |
| failed is_def_eq | |
| [class_instances] (5) ?x_15 : comm_ring G := @free_abelian_group.comm_ring ?x_47 ?x_48 | |
| failed is_def_eq | |
| [class_instances] (5) ?x_15 : comm_ring G := @ideal.quotient.comm_ring ?x_49 ?x_50 ?x_51 | |
| failed is_def_eq | |
| [class_instances] (5) ?x_15 : comm_ring G := @finsupp.comm_ring ?x_52 ?x_53 ?x_54 ?x_55 | |
| failed is_def_eq | |
| [class_instances] (5) ?x_15 : comm_ring G := @prod.comm_ring ?x_56 ?x_57 ?x_58 ?x_59 | |
| failed is_def_eq | |
| [class_instances] (5) ?x_15 : comm_ring G := @pi.comm_ring ?x_60 ?x_61 ?x_62 | |
| failed is_def_eq | |
| [class_instances] (5) ?x_15 : comm_ring G := @subtype.comm_ring ?x_63 ?x_64 ?x_65 ?x_66 | |
| failed is_def_eq | |
| [class_instances] (5) ?x_15 : comm_ring G := @subset.comm_ring ?x_67 ?x_68 ?x_69 ?x_70 | |
| failed is_def_eq | |
| [class_instances] (5) ?x_15 : comm_ring G := rat.comm_ring | |
| failed is_def_eq | |
| [class_instances] (5) ?x_15 : comm_ring G := int.comm_ring | |
| failed is_def_eq | |
| [class_instances] (5) ?x_15 : comm_ring G := @nonzero_comm_ring.to_comm_ring ?x_71 ?x_72 | |
| [class_instances] (6) ?x_72 : nonzero_comm_ring G := real.nonzero_comm_ring | |
| failed is_def_eq | |
| [class_instances] (6) ?x_72 : nonzero_comm_ring G := @polynomial.nonzero_comm_ring ?x_73 ?x_74 | |
| failed is_def_eq | |
| [class_instances] (6) ?x_72 : nonzero_comm_ring G := @prod.nonzero_comm_ring ?x_75 ?x_76 ?x_77 ?x_78 | |
| failed is_def_eq | |
| [class_instances] (6) ?x_72 : nonzero_comm_ring G := rat.nonzero_comm_ring | |
| failed is_def_eq | |
| [class_instances] (6) ?x_72 : nonzero_comm_ring G := @euclidean_domain.to_nonzero_comm_ring ?x_79 ?x_80 | |
| [class_instances] (7) ?x_80 : euclidean_domain G := @polynomial.euclidean_domain ?x_81 ?x_82 | |
| failed is_def_eq | |
| [class_instances] (7) ?x_80 : euclidean_domain G := int.euclidean_domain | |
| failed is_def_eq | |
| [class_instances] (7) ?x_80 : euclidean_domain G := @discrete_field.to_euclidean_domain ?x_83 ?x_84 | |
| [class_instances] (8) ?x_84 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (8) ?x_84 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (8) ?x_84 : discrete_field G := @local_ring.residue_field.discrete_field ?x_85 ?x_86 | |
| failed is_def_eq | |
| [class_instances] (8) ?x_84 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (8) ?x_84 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_87 ?x_88 | |
| [class_instances] (9) ?x_88 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (9) ?x_88 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (6) ?x_72 : nonzero_comm_ring G := @local_ring.to_nonzero_comm_ring ?x_73 ?x_74 | |
| [class_instances] (7) ?x_74 : local_ring G := @discrete_field.local_ring ?x_75 ?x_76 | |
| [class_instances] (8) ?x_76 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (8) ?x_76 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (8) ?x_76 : discrete_field G := @local_ring.residue_field.discrete_field ?x_77 ?x_78 | |
| failed is_def_eq | |
| [class_instances] (8) ?x_76 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (8) ?x_76 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_79 ?x_80 | |
| [class_instances] (9) ?x_80 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (9) ?x_80 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (6) ?x_72 : nonzero_comm_ring G := @integral_domain.to_nonzero_comm_ring ?x_73 ?x_74 | |
| [class_instances] (7) ?x_74 : integral_domain G := real.integral_domain | |
| failed is_def_eq | |
| [class_instances] (7) ?x_74 : integral_domain G := @polynomial.integral_domain ?x_75 ?x_76 | |
| failed is_def_eq | |
| [class_instances] (7) ?x_74 : integral_domain G := @ideal.quotient.integral_domain ?x_77 ?x_78 ?x_79 ?x_80 | |
| failed is_def_eq | |
| [class_instances] (7) ?x_74 : integral_domain G := @subring.domain ?x_81 ?x_82 ?x_83 ?x_84 | |
| failed is_def_eq | |
| [class_instances] (7) ?x_74 : integral_domain G := rat.integral_domain | |
| failed is_def_eq | |
| [class_instances] (7) ?x_74 : integral_domain G := @principal_ideal_domain.to_integral_domain ?x_85 ?x_86 | |
| [class_instances] (8) ?x_86 : principal_ideal_domain G := @euclidean_domain.to_principal_ideal_domain ?x_87 ?x_88 | |
| [class_instances] (9) ?x_88 : euclidean_domain G := @polynomial.euclidean_domain ?x_89 ?x_90 | |
| failed is_def_eq | |
| [class_instances] (9) ?x_88 : euclidean_domain G := int.euclidean_domain | |
| failed is_def_eq | |
| [class_instances] (9) ?x_88 : euclidean_domain G := @discrete_field.to_euclidean_domain ?x_91 ?x_92 | |
| [class_instances] (10) ?x_92 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (10) ?x_92 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (10) ?x_92 : discrete_field G := @local_ring.residue_field.discrete_field ?x_93 ?x_94 | |
| failed is_def_eq | |
| [class_instances] (10) ?x_92 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (10) ?x_92 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_95 ?x_96 | |
| [class_instances] (11) ?x_96 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (11) ?x_96 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (7) ?x_74 : integral_domain G := @euclidean_domain.integral_domain ?x_75 ?x_76 | |
| [class_instances] (8) ?x_76 : euclidean_domain G := @polynomial.euclidean_domain ?x_77 ?x_78 | |
| failed is_def_eq | |
| [class_instances] (8) ?x_76 : euclidean_domain G := int.euclidean_domain | |
| failed is_def_eq | |
| [class_instances] (8) ?x_76 : euclidean_domain G := @discrete_field.to_euclidean_domain ?x_79 ?x_80 | |
| [class_instances] (9) ?x_80 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (9) ?x_80 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (9) ?x_80 : discrete_field G := @local_ring.residue_field.discrete_field ?x_81 ?x_82 | |
| failed is_def_eq | |
| [class_instances] (9) ?x_80 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (9) ?x_80 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_83 ?x_84 | |
| [class_instances] (10) ?x_84 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (10) ?x_84 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (7) ?x_74 : integral_domain G := @normalization_domain.to_integral_domain ?x_75 ?x_76 | |
| [class_instances] (8) ?x_76 : normalization_domain G := @polynomial.normalization_domain ?x_77 ?x_78 | |
| failed is_def_eq | |
| [class_instances] (8) ?x_76 : normalization_domain G := int.normalization_domain | |
| failed is_def_eq | |
| [class_instances] (8) ?x_76 : normalization_domain G := @gcd_domain.to_normalization_domain ?x_79 ?x_80 | |
| [class_instances] (9) ?x_80 : gcd_domain G := int.gcd_domain | |
| failed is_def_eq | |
| [class_instances] (7) ?x_74 : integral_domain G := @field.to_integral_domain ?x_75 ?x_76 | |
| [class_instances] (8) ?x_76 : field G := real.field | |
| failed is_def_eq | |
| [class_instances] (8) ?x_76 : field G := rat.field | |
| failed is_def_eq | |
| [class_instances] (8) ?x_76 : field G := @linear_ordered_field.to_field ?x_77 ?x_78 | |
| [class_instances] (9) ?x_78 : linear_ordered_field G := real.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (9) ?x_78 : linear_ordered_field G := rat.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (9) ?x_78 : linear_ordered_field G := @discrete_linear_ordered_field.to_linear_ordered_field ?x_79 ?x_80 | |
| [class_instances] (10) ?x_80 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (10) ?x_80 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (8) ?x_76 : field G := @discrete_field.to_field ?x_77 ?x_78 | |
| [class_instances] (9) ?x_78 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (9) ?x_78 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (9) ?x_78 : discrete_field G := @local_ring.residue_field.discrete_field ?x_79 ?x_80 | |
| failed is_def_eq | |
| [class_instances] (9) ?x_78 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (9) ?x_78 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_81 ?x_82 | |
| [class_instances] (10) ?x_82 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (10) ?x_82 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (7) ?x_74 : integral_domain G := @discrete_field.to_integral_domain ?x_75 ?x_76 ?x_77 | |
| [class_instances] (8) ?x_76 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (8) ?x_76 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (8) ?x_76 : discrete_field G := @local_ring.residue_field.discrete_field ?x_78 ?x_79 | |
| failed is_def_eq | |
| [class_instances] (8) ?x_76 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (8) ?x_76 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_80 ?x_81 | |
| [class_instances] (9) ?x_81 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (9) ?x_81 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (7) ?x_74 : integral_domain G := @linear_ordered_comm_ring.to_integral_domain ?x_75 ?x_76 | |
| [class_instances] (8) ?x_76 : linear_ordered_comm_ring G := real.linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (8) ?x_76 : linear_ordered_comm_ring G := rat.linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (8) ?x_76 : linear_ordered_comm_ring G := @decidable_linear_ordered_comm_ring.to_linear_ordered_comm_ring ?x_77 ?x_78 | |
| [class_instances] (9) ?x_78 : decidable_linear_ordered_comm_ring G := real.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (9) ?x_78 : decidable_linear_ordered_comm_ring G := rat.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (9) ?x_78 : decidable_linear_ordered_comm_ring G := int.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (9) ?x_78 : decidable_linear_ordered_comm_ring G := @discrete_linear_ordered_field.to_decidable_linear_ordered_comm_ring ?x_79 ?x_80 | |
| [class_instances] (10) ?x_80 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (10) ?x_80 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (9) ?x_78 : decidable_linear_ordered_comm_ring G := @linear_nonneg_ring.to_decidable_linear_ordered_comm_ring ?x_79 ?x_80 ?x_81 ?x_82 | |
| [class_instances] (5) ?x_15 : comm_ring G := @field.to_comm_ring ?x_16 ?x_17 | |
| [class_instances] (6) ?x_17 : field G := real.field | |
| failed is_def_eq | |
| [class_instances] (6) ?x_17 : field G := rat.field | |
| failed is_def_eq | |
| [class_instances] (6) ?x_17 : field G := @linear_ordered_field.to_field ?x_18 ?x_19 | |
| [class_instances] (7) ?x_19 : linear_ordered_field G := real.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (7) ?x_19 : linear_ordered_field G := rat.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (7) ?x_19 : linear_ordered_field G := @discrete_linear_ordered_field.to_linear_ordered_field ?x_20 ?x_21 | |
| [class_instances] (8) ?x_21 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (8) ?x_21 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (6) ?x_17 : field G := @discrete_field.to_field ?x_18 ?x_19 | |
| [class_instances] (7) ?x_19 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (7) ?x_19 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (7) ?x_19 : discrete_field G := @local_ring.residue_field.discrete_field ?x_20 ?x_21 | |
| failed is_def_eq | |
| [class_instances] (7) ?x_19 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (7) ?x_19 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_22 ?x_23 | |
| [class_instances] (8) ?x_23 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (8) ?x_23 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (5) ?x_15 : comm_ring G := @integral_domain.to_comm_ring ?x_16 ?x_17 | |
| [class_instances] (6) ?x_17 : integral_domain G := real.integral_domain | |
| failed is_def_eq | |
| [class_instances] (6) ?x_17 : integral_domain G := @polynomial.integral_domain ?x_18 ?x_19 | |
| failed is_def_eq | |
| [class_instances] (6) ?x_17 : integral_domain G := @ideal.quotient.integral_domain ?x_20 ?x_21 ?x_22 ?x_23 | |
| failed is_def_eq | |
| [class_instances] (6) ?x_17 : integral_domain G := @subring.domain ?x_24 ?x_25 ?x_26 ?x_27 | |
| failed is_def_eq | |
| [class_instances] (6) ?x_17 : integral_domain G := rat.integral_domain | |
| failed is_def_eq | |
| [class_instances] (6) ?x_17 : integral_domain G := @principal_ideal_domain.to_integral_domain ?x_28 ?x_29 | |
| [class_instances] (7) ?x_29 : principal_ideal_domain G := @euclidean_domain.to_principal_ideal_domain ?x_30 ?x_31 | |
| [class_instances] (8) ?x_31 : euclidean_domain G := @polynomial.euclidean_domain ?x_32 ?x_33 | |
| failed is_def_eq | |
| [class_instances] (8) ?x_31 : euclidean_domain G := int.euclidean_domain | |
| failed is_def_eq | |
| [class_instances] (8) ?x_31 : euclidean_domain G := @discrete_field.to_euclidean_domain ?x_34 ?x_35 | |
| [class_instances] (9) ?x_35 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (9) ?x_35 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (9) ?x_35 : discrete_field G := @local_ring.residue_field.discrete_field ?x_36 ?x_37 | |
| failed is_def_eq | |
| [class_instances] (9) ?x_35 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (9) ?x_35 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_38 ?x_39 | |
| [class_instances] (10) ?x_39 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (10) ?x_39 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (6) ?x_17 : integral_domain G := @euclidean_domain.integral_domain ?x_18 ?x_19 | |
| [class_instances] (7) ?x_19 : euclidean_domain G := @polynomial.euclidean_domain ?x_20 ?x_21 | |
| failed is_def_eq | |
| [class_instances] (7) ?x_19 : euclidean_domain G := int.euclidean_domain | |
| failed is_def_eq | |
| [class_instances] (7) ?x_19 : euclidean_domain G := @discrete_field.to_euclidean_domain ?x_22 ?x_23 | |
| [class_instances] (8) ?x_23 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (8) ?x_23 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (8) ?x_23 : discrete_field G := @local_ring.residue_field.discrete_field ?x_24 ?x_25 | |
| failed is_def_eq | |
| [class_instances] (8) ?x_23 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (8) ?x_23 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_26 ?x_27 | |
| [class_instances] (9) ?x_27 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (9) ?x_27 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (6) ?x_17 : integral_domain G := @normalization_domain.to_integral_domain ?x_18 ?x_19 | |
| [class_instances] (7) ?x_19 : normalization_domain G := @polynomial.normalization_domain ?x_20 ?x_21 | |
| failed is_def_eq | |
| [class_instances] (7) ?x_19 : normalization_domain G := int.normalization_domain | |
| failed is_def_eq | |
| [class_instances] (7) ?x_19 : normalization_domain G := @gcd_domain.to_normalization_domain ?x_22 ?x_23 | |
| [class_instances] (8) ?x_23 : gcd_domain G := int.gcd_domain | |
| failed is_def_eq | |
| [class_instances] (6) ?x_17 : integral_domain G := @field.to_integral_domain ?x_18 ?x_19 | |
| [class_instances] (7) ?x_19 : field G := real.field | |
| failed is_def_eq | |
| [class_instances] (7) ?x_19 : field G := rat.field | |
| failed is_def_eq | |
| [class_instances] (7) ?x_19 : field G := @linear_ordered_field.to_field ?x_20 ?x_21 | |
| [class_instances] (8) ?x_21 : linear_ordered_field G := real.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (8) ?x_21 : linear_ordered_field G := rat.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (8) ?x_21 : linear_ordered_field G := @discrete_linear_ordered_field.to_linear_ordered_field ?x_22 ?x_23 | |
| [class_instances] (9) ?x_23 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (9) ?x_23 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (7) ?x_19 : field G := @discrete_field.to_field ?x_20 ?x_21 | |
| [class_instances] (8) ?x_21 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (8) ?x_21 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (8) ?x_21 : discrete_field G := @local_ring.residue_field.discrete_field ?x_22 ?x_23 | |
| failed is_def_eq | |
| [class_instances] (8) ?x_21 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (8) ?x_21 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_24 ?x_25 | |
| [class_instances] (9) ?x_25 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (9) ?x_25 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (6) ?x_17 : integral_domain G := @discrete_field.to_integral_domain ?x_18 ?x_19 ?x_20 | |
| [class_instances] (7) ?x_19 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (7) ?x_19 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (7) ?x_19 : discrete_field G := @local_ring.residue_field.discrete_field ?x_21 ?x_22 | |
| failed is_def_eq | |
| [class_instances] (7) ?x_19 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (7) ?x_19 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_23 ?x_24 | |
| [class_instances] (8) ?x_24 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (8) ?x_24 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (6) ?x_17 : integral_domain G := @linear_ordered_comm_ring.to_integral_domain ?x_18 ?x_19 | |
| [class_instances] (7) ?x_19 : linear_ordered_comm_ring G := real.linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (7) ?x_19 : linear_ordered_comm_ring G := rat.linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (7) ?x_19 : linear_ordered_comm_ring G := @decidable_linear_ordered_comm_ring.to_linear_ordered_comm_ring ?x_20 ?x_21 | |
| [class_instances] (8) ?x_21 : decidable_linear_ordered_comm_ring G := real.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (8) ?x_21 : decidable_linear_ordered_comm_ring G := rat.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (8) ?x_21 : decidable_linear_ordered_comm_ring G := int.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (8) ?x_21 : decidable_linear_ordered_comm_ring G := @discrete_linear_ordered_field.to_decidable_linear_ordered_comm_ring ?x_22 ?x_23 | |
| [class_instances] (9) ?x_23 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (9) ?x_23 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (8) ?x_21 : decidable_linear_ordered_comm_ring G := @linear_nonneg_ring.to_decidable_linear_ordered_comm_ring ?x_22 ?x_23 ?x_24 ?x_25 | |
| [class_instances] (4) ?x_13 : _root_.reversible G := @ @_root_.reversible_of_reduced ?x_14 ?x_15 | |
| [class_instances] (4) ?x_13 : _root_.reversible G := @ @_root_.reversible_of_domain ?x_14 ?x_15 | |
| [class_instances] (5) ?x_15 : domain G := real.domain | |
| failed is_def_eq | |
| [class_instances] (5) ?x_15 : domain G := @division_ring.to_domain ?x_16 ?x_17 | |
| [class_instances] (6) ?x_17 : division_ring G := real.division_ring | |
| failed is_def_eq | |
| [class_instances] (6) ?x_17 : division_ring G := rat.division_ring | |
| failed is_def_eq | |
| [class_instances] (6) ?x_17 : division_ring G := @field.to_division_ring ?x_18 ?x_19 | |
| [class_instances] (7) ?x_19 : field G := real.field | |
| failed is_def_eq | |
| [class_instances] (7) ?x_19 : field G := rat.field | |
| failed is_def_eq | |
| [class_instances] (7) ?x_19 : field G := @linear_ordered_field.to_field ?x_20 ?x_21 | |
| [class_instances] (8) ?x_21 : linear_ordered_field G := real.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (8) ?x_21 : linear_ordered_field G := rat.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (8) ?x_21 : linear_ordered_field G := @discrete_linear_ordered_field.to_linear_ordered_field ?x_22 ?x_23 | |
| [class_instances] (9) ?x_23 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (9) ?x_23 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (7) ?x_19 : field G := @discrete_field.to_field ?x_20 ?x_21 | |
| [class_instances] (8) ?x_21 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (8) ?x_21 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (8) ?x_21 : discrete_field G := @local_ring.residue_field.discrete_field ?x_22 ?x_23 | |
| failed is_def_eq | |
| [class_instances] (8) ?x_21 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (8) ?x_21 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_24 ?x_25 | |
| [class_instances] (9) ?x_25 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (9) ?x_25 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (5) ?x_15 : domain G := @linear_nonneg_ring.to_domain ?x_16 ?x_17 | |
| [class_instances] (5) ?x_15 : domain G := @linear_ordered_ring.to_domain ?x_16 ?x_17 | |
| [class_instances] (6) ?x_17 : linear_ordered_ring G := real.linear_ordered_ring | |
| failed is_def_eq | |
| [class_instances] (6) ?x_17 : linear_ordered_ring G := rat.linear_ordered_ring | |
| failed is_def_eq | |
| [class_instances] (6) ?x_17 : linear_ordered_ring G := @linear_ordered_field.to_linear_ordered_ring ?x_18 ?x_19 | |
| [class_instances] (7) ?x_19 : linear_ordered_field G := real.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (7) ?x_19 : linear_ordered_field G := rat.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (7) ?x_19 : linear_ordered_field G := @discrete_linear_ordered_field.to_linear_ordered_field ?x_20 ?x_21 | |
| [class_instances] (8) ?x_21 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (8) ?x_21 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (6) ?x_17 : linear_ordered_ring G := @linear_nonneg_ring.to_linear_ordered_ring ?x_18 ?x_19 | |
| [class_instances] (6) ?x_17 : linear_ordered_ring G := @linear_ordered_comm_ring.to_linear_ordered_ring ?x_18 ?x_19 | |
| [class_instances] (7) ?x_19 : linear_ordered_comm_ring G := real.linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (7) ?x_19 : linear_ordered_comm_ring G := rat.linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (7) ?x_19 : linear_ordered_comm_ring G := @decidable_linear_ordered_comm_ring.to_linear_ordered_comm_ring ?x_20 ?x_21 | |
| [class_instances] (8) ?x_21 : decidable_linear_ordered_comm_ring G := real.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (8) ?x_21 : decidable_linear_ordered_comm_ring G := rat.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (8) ?x_21 : decidable_linear_ordered_comm_ring G := int.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (8) ?x_21 : decidable_linear_ordered_comm_ring G := @discrete_linear_ordered_field.to_decidable_linear_ordered_comm_ring ?x_22 ?x_23 | |
| [class_instances] (9) ?x_23 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (9) ?x_23 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (8) ?x_21 : decidable_linear_ordered_comm_ring G := @linear_nonneg_ring.to_decidable_linear_ordered_comm_ring ?x_22 ?x_23 ?x_24 ?x_25 | |
| [class_instances] (5) ?x_15 : domain G := @integral_domain.to_domain ?x_16 ?x_17 | |
| [class_instances] (6) ?x_17 : integral_domain G := real.integral_domain | |
| failed is_def_eq | |
| [class_instances] (6) ?x_17 : integral_domain G := @polynomial.integral_domain ?x_18 ?x_19 | |
| failed is_def_eq | |
| [class_instances] (6) ?x_17 : integral_domain G := @ideal.quotient.integral_domain ?x_20 ?x_21 ?x_22 ?x_23 | |
| failed is_def_eq | |
| [class_instances] (6) ?x_17 : integral_domain G := @subring.domain ?x_24 ?x_25 ?x_26 ?x_27 | |
| failed is_def_eq | |
| [class_instances] (6) ?x_17 : integral_domain G := rat.integral_domain | |
| failed is_def_eq | |
| [class_instances] (6) ?x_17 : integral_domain G := @principal_ideal_domain.to_integral_domain ?x_28 ?x_29 | |
| [class_instances] (7) ?x_29 : principal_ideal_domain G := @euclidean_domain.to_principal_ideal_domain ?x_30 ?x_31 | |
| [class_instances] (8) ?x_31 : euclidean_domain G := @polynomial.euclidean_domain ?x_32 ?x_33 | |
| failed is_def_eq | |
| [class_instances] (8) ?x_31 : euclidean_domain G := int.euclidean_domain | |
| failed is_def_eq | |
| [class_instances] (8) ?x_31 : euclidean_domain G := @discrete_field.to_euclidean_domain ?x_34 ?x_35 | |
| [class_instances] (9) ?x_35 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (9) ?x_35 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (9) ?x_35 : discrete_field G := @local_ring.residue_field.discrete_field ?x_36 ?x_37 | |
| failed is_def_eq | |
| [class_instances] (9) ?x_35 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (9) ?x_35 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_38 ?x_39 | |
| [class_instances] (10) ?x_39 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (10) ?x_39 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (6) ?x_17 : integral_domain G := @euclidean_domain.integral_domain ?x_18 ?x_19 | |
| [class_instances] (7) ?x_19 : euclidean_domain G := @polynomial.euclidean_domain ?x_20 ?x_21 | |
| failed is_def_eq | |
| [class_instances] (7) ?x_19 : euclidean_domain G := int.euclidean_domain | |
| failed is_def_eq | |
| [class_instances] (7) ?x_19 : euclidean_domain G := @discrete_field.to_euclidean_domain ?x_22 ?x_23 | |
| [class_instances] (8) ?x_23 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (8) ?x_23 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (8) ?x_23 : discrete_field G := @local_ring.residue_field.discrete_field ?x_24 ?x_25 | |
| failed is_def_eq | |
| [class_instances] (8) ?x_23 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (8) ?x_23 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_26 ?x_27 | |
| [class_instances] (9) ?x_27 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (9) ?x_27 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (6) ?x_17 : integral_domain G := @normalization_domain.to_integral_domain ?x_18 ?x_19 | |
| [class_instances] (7) ?x_19 : normalization_domain G := @polynomial.normalization_domain ?x_20 ?x_21 | |
| failed is_def_eq | |
| [class_instances] (7) ?x_19 : normalization_domain G := int.normalization_domain | |
| failed is_def_eq | |
| [class_instances] (7) ?x_19 : normalization_domain G := @gcd_domain.to_normalization_domain ?x_22 ?x_23 | |
| [class_instances] (8) ?x_23 : gcd_domain G := int.gcd_domain | |
| failed is_def_eq | |
| [class_instances] (6) ?x_17 : integral_domain G := @field.to_integral_domain ?x_18 ?x_19 | |
| [class_instances] (7) ?x_19 : field G := real.field | |
| failed is_def_eq | |
| [class_instances] (7) ?x_19 : field G := rat.field | |
| failed is_def_eq | |
| [class_instances] (7) ?x_19 : field G := @linear_ordered_field.to_field ?x_20 ?x_21 | |
| [class_instances] (8) ?x_21 : linear_ordered_field G := real.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (8) ?x_21 : linear_ordered_field G := rat.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (8) ?x_21 : linear_ordered_field G := @discrete_linear_ordered_field.to_linear_ordered_field ?x_22 ?x_23 | |
| [class_instances] (9) ?x_23 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (9) ?x_23 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (7) ?x_19 : field G := @discrete_field.to_field ?x_20 ?x_21 | |
| [class_instances] (8) ?x_21 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (8) ?x_21 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (8) ?x_21 : discrete_field G := @local_ring.residue_field.discrete_field ?x_22 ?x_23 | |
| failed is_def_eq | |
| [class_instances] (8) ?x_21 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (8) ?x_21 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_24 ?x_25 | |
| [class_instances] (9) ?x_25 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (9) ?x_25 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (6) ?x_17 : integral_domain G := @discrete_field.to_integral_domain ?x_18 ?x_19 ?x_20 | |
| [class_instances] (7) ?x_19 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (7) ?x_19 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (7) ?x_19 : discrete_field G := @local_ring.residue_field.discrete_field ?x_21 ?x_22 | |
| failed is_def_eq | |
| [class_instances] (7) ?x_19 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (7) ?x_19 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_23 ?x_24 | |
| [class_instances] (8) ?x_24 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (8) ?x_24 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (6) ?x_17 : integral_domain G := @linear_ordered_comm_ring.to_integral_domain ?x_18 ?x_19 | |
| [class_instances] (7) ?x_19 : linear_ordered_comm_ring G := real.linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (7) ?x_19 : linear_ordered_comm_ring G := rat.linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (7) ?x_19 : linear_ordered_comm_ring G := @decidable_linear_ordered_comm_ring.to_linear_ordered_comm_ring ?x_20 ?x_21 | |
| [class_instances] (8) ?x_21 : decidable_linear_ordered_comm_ring G := real.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (8) ?x_21 : decidable_linear_ordered_comm_ring G := rat.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (8) ?x_21 : decidable_linear_ordered_comm_ring G := int.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (8) ?x_21 : decidable_linear_ordered_comm_ring G := @discrete_linear_ordered_field.to_decidable_linear_ordered_comm_ring ?x_22 ?x_23 | |
| [class_instances] (9) ?x_23 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (9) ?x_23 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (8) ?x_21 : decidable_linear_ordered_comm_ring G := @linear_nonneg_ring.to_decidable_linear_ordered_comm_ring ?x_22 ?x_23 ?x_24 ?x_25 | |
| [class_instances] (3) ?x_11 : ring G := @ @reduced.to_ring ?x_12 ?x_13 | |
| [class_instances] (3) ?x_11 : ring G := @dedekind_finite.to_ring ?x_12 ?x_13 | |
| [class_instances] (4) ?x_13 : dedekind_finite G := @pi.dedekind_finite ?x_14 ?x_15 ?x_16 | |
| failed is_def_eq | |
| [class_instances] (4) ?x_13 : dedekind_finite G := @ @_root_.dedekind_finite_of_noetherian ?x_17 ?x_18 ?x_19 | |
| [class_instances] (5) ?x_18 : ring G := @ @reversible.to_ring ?x_20 ?x_21 | |
| [class_instances] (6) ?x_21 : _root_.reversible G := @ @_root_.reversible_of_comm_ring ?x_22 ?x_23 | |
| [class_instances] (7) ?x_23 : comm_ring G := @subalgebra.comm_ring ?x_24 ?x_25 ?x_26 ?x_27 ?x_28 ?x_29 | |
| failed is_def_eq | |
| [class_instances] (7) ?x_23 : comm_ring G := @algebra.comap.comm_ring ?x_30 ?x_31 ?x_32 ?x_33 ?x_34 ?x_35 ?x_36 ?x_37 | |
| failed is_def_eq | |
| [class_instances] (7) ?x_23 : comm_ring G := complex.comm_ring | |
| failed is_def_eq | |
| [class_instances] (7) ?x_23 : comm_ring G := real.comm_ring | |
| failed is_def_eq | |
| [class_instances] (7) ?x_23 : comm_ring G := @cau_seq.completion.comm_ring ?x_38 ?x_39 ?x_40 ?x_41 ?x_42 ?x_43 | |
| failed is_def_eq | |
| [class_instances] (7) ?x_23 : comm_ring G := @cau_seq.comm_ring ?x_44 ?x_45 ?x_46 ?x_47 ?x_48 ?x_49 | |
| failed is_def_eq | |
| [class_instances] (7) ?x_23 : comm_ring G := @mv_polynomial.comm_ring ?x_50 ?x_51 ?x_52 | |
| failed is_def_eq | |
| [class_instances] (7) ?x_23 : comm_ring G := @polynomial.comm_ring ?x_53 ?x_54 | |
| failed is_def_eq | |
| [class_instances] (7) ?x_23 : comm_ring G := @free_abelian_group.comm_ring ?x_55 ?x_56 | |
| failed is_def_eq | |
| [class_instances] (7) ?x_23 : comm_ring G := @ideal.quotient.comm_ring ?x_57 ?x_58 ?x_59 | |
| failed is_def_eq | |
| [class_instances] (7) ?x_23 : comm_ring G := @finsupp.comm_ring ?x_60 ?x_61 ?x_62 ?x_63 | |
| failed is_def_eq | |
| [class_instances] (7) ?x_23 : comm_ring G := @prod.comm_ring ?x_64 ?x_65 ?x_66 ?x_67 | |
| failed is_def_eq | |
| [class_instances] (7) ?x_23 : comm_ring G := @pi.comm_ring ?x_68 ?x_69 ?x_70 | |
| failed is_def_eq | |
| [class_instances] (7) ?x_23 : comm_ring G := @subtype.comm_ring ?x_71 ?x_72 ?x_73 ?x_74 | |
| failed is_def_eq | |
| [class_instances] (7) ?x_23 : comm_ring G := @subset.comm_ring ?x_75 ?x_76 ?x_77 ?x_78 | |
| failed is_def_eq | |
| [class_instances] (7) ?x_23 : comm_ring G := rat.comm_ring | |
| failed is_def_eq | |
| [class_instances] (7) ?x_23 : comm_ring G := int.comm_ring | |
| failed is_def_eq | |
| [class_instances] (7) ?x_23 : comm_ring G := @nonzero_comm_ring.to_comm_ring ?x_79 ?x_80 | |
| [class_instances] (8) ?x_80 : nonzero_comm_ring G := real.nonzero_comm_ring | |
| failed is_def_eq | |
| [class_instances] (8) ?x_80 : nonzero_comm_ring G := @polynomial.nonzero_comm_ring ?x_81 ?x_82 | |
| failed is_def_eq | |
| [class_instances] (8) ?x_80 : nonzero_comm_ring G := @prod.nonzero_comm_ring ?x_83 ?x_84 ?x_85 ?x_86 | |
| failed is_def_eq | |
| [class_instances] (8) ?x_80 : nonzero_comm_ring G := rat.nonzero_comm_ring | |
| failed is_def_eq | |
| [class_instances] (8) ?x_80 : nonzero_comm_ring G := @euclidean_domain.to_nonzero_comm_ring ?x_87 ?x_88 | |
| [class_instances] (9) ?x_88 : euclidean_domain G := @polynomial.euclidean_domain ?x_89 ?x_90 | |
| failed is_def_eq | |
| [class_instances] (9) ?x_88 : euclidean_domain G := int.euclidean_domain | |
| failed is_def_eq | |
| [class_instances] (9) ?x_88 : euclidean_domain G := @discrete_field.to_euclidean_domain ?x_91 ?x_92 | |
| [class_instances] (10) ?x_92 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (10) ?x_92 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (10) ?x_92 : discrete_field G := @local_ring.residue_field.discrete_field ?x_93 ?x_94 | |
| failed is_def_eq | |
| [class_instances] (10) ?x_92 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (10) ?x_92 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_95 ?x_96 | |
| [class_instances] (11) ?x_96 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (11) ?x_96 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (8) ?x_80 : nonzero_comm_ring G := @local_ring.to_nonzero_comm_ring ?x_81 ?x_82 | |
| [class_instances] (9) ?x_82 : local_ring G := @discrete_field.local_ring ?x_83 ?x_84 | |
| [class_instances] (10) ?x_84 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (10) ?x_84 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (10) ?x_84 : discrete_field G := @local_ring.residue_field.discrete_field ?x_85 ?x_86 | |
| failed is_def_eq | |
| [class_instances] (10) ?x_84 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (10) ?x_84 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_87 ?x_88 | |
| [class_instances] (11) ?x_88 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (11) ?x_88 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (8) ?x_80 : nonzero_comm_ring G := @integral_domain.to_nonzero_comm_ring ?x_81 ?x_82 | |
| [class_instances] (9) ?x_82 : integral_domain G := real.integral_domain | |
| failed is_def_eq | |
| [class_instances] (9) ?x_82 : integral_domain G := @polynomial.integral_domain ?x_83 ?x_84 | |
| failed is_def_eq | |
| [class_instances] (9) ?x_82 : integral_domain G := @ideal.quotient.integral_domain ?x_85 ?x_86 ?x_87 ?x_88 | |
| failed is_def_eq | |
| [class_instances] (9) ?x_82 : integral_domain G := @subring.domain ?x_89 ?x_90 ?x_91 ?x_92 | |
| failed is_def_eq | |
| [class_instances] (9) ?x_82 : integral_domain G := rat.integral_domain | |
| failed is_def_eq | |
| [class_instances] (9) ?x_82 : integral_domain G := @principal_ideal_domain.to_integral_domain ?x_93 ?x_94 | |
| [class_instances] (10) ?x_94 : principal_ideal_domain G := @euclidean_domain.to_principal_ideal_domain ?x_95 ?x_96 | |
| [class_instances] (11) ?x_96 : euclidean_domain G := @polynomial.euclidean_domain ?x_97 ?x_98 | |
| failed is_def_eq | |
| [class_instances] (11) ?x_96 : euclidean_domain G := int.euclidean_domain | |
| failed is_def_eq | |
| [class_instances] (11) ?x_96 : euclidean_domain G := @discrete_field.to_euclidean_domain ?x_99 ?x_100 | |
| [class_instances] (12) ?x_100 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (12) ?x_100 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (12) ?x_100 : discrete_field G := @local_ring.residue_field.discrete_field ?x_101 ?x_102 | |
| failed is_def_eq | |
| [class_instances] (12) ?x_100 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (12) ?x_100 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_103 ?x_104 | |
| [class_instances] (13) ?x_104 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (13) ?x_104 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (9) ?x_82 : integral_domain G := @euclidean_domain.integral_domain ?x_83 ?x_84 | |
| [class_instances] (10) ?x_84 : euclidean_domain G := @polynomial.euclidean_domain ?x_85 ?x_86 | |
| failed is_def_eq | |
| [class_instances] (10) ?x_84 : euclidean_domain G := int.euclidean_domain | |
| failed is_def_eq | |
| [class_instances] (10) ?x_84 : euclidean_domain G := @discrete_field.to_euclidean_domain ?x_87 ?x_88 | |
| [class_instances] (11) ?x_88 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (11) ?x_88 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (11) ?x_88 : discrete_field G := @local_ring.residue_field.discrete_field ?x_89 ?x_90 | |
| failed is_def_eq | |
| [class_instances] (11) ?x_88 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (11) ?x_88 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_91 ?x_92 | |
| [class_instances] (12) ?x_92 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (12) ?x_92 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (9) ?x_82 : integral_domain G := @normalization_domain.to_integral_domain ?x_83 ?x_84 | |
| [class_instances] (10) ?x_84 : normalization_domain G := @polynomial.normalization_domain ?x_85 ?x_86 | |
| failed is_def_eq | |
| [class_instances] (10) ?x_84 : normalization_domain G := int.normalization_domain | |
| failed is_def_eq | |
| [class_instances] (10) ?x_84 : normalization_domain G := @gcd_domain.to_normalization_domain ?x_87 ?x_88 | |
| [class_instances] (11) ?x_88 : gcd_domain G := int.gcd_domain | |
| failed is_def_eq | |
| [class_instances] (9) ?x_82 : integral_domain G := @field.to_integral_domain ?x_83 ?x_84 | |
| [class_instances] (10) ?x_84 : field G := real.field | |
| failed is_def_eq | |
| [class_instances] (10) ?x_84 : field G := rat.field | |
| failed is_def_eq | |
| [class_instances] (10) ?x_84 : field G := @linear_ordered_field.to_field ?x_85 ?x_86 | |
| [class_instances] (11) ?x_86 : linear_ordered_field G := real.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (11) ?x_86 : linear_ordered_field G := rat.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (11) ?x_86 : linear_ordered_field G := @discrete_linear_ordered_field.to_linear_ordered_field ?x_87 ?x_88 | |
| [class_instances] (12) ?x_88 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (12) ?x_88 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (10) ?x_84 : field G := @discrete_field.to_field ?x_85 ?x_86 | |
| [class_instances] (11) ?x_86 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (11) ?x_86 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (11) ?x_86 : discrete_field G := @local_ring.residue_field.discrete_field ?x_87 ?x_88 | |
| failed is_def_eq | |
| [class_instances] (11) ?x_86 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (11) ?x_86 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_89 ?x_90 | |
| [class_instances] (12) ?x_90 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (12) ?x_90 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (9) ?x_82 : integral_domain G := @discrete_field.to_integral_domain ?x_83 ?x_84 ?x_85 | |
| [class_instances] (10) ?x_84 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (10) ?x_84 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (10) ?x_84 : discrete_field G := @local_ring.residue_field.discrete_field ?x_86 ?x_87 | |
| failed is_def_eq | |
| [class_instances] (10) ?x_84 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (10) ?x_84 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_88 ?x_89 | |
| [class_instances] (11) ?x_89 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (11) ?x_89 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (9) ?x_82 : integral_domain G := @linear_ordered_comm_ring.to_integral_domain ?x_83 ?x_84 | |
| [class_instances] (10) ?x_84 : linear_ordered_comm_ring G := real.linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (10) ?x_84 : linear_ordered_comm_ring G := rat.linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (10) ?x_84 : linear_ordered_comm_ring G := @decidable_linear_ordered_comm_ring.to_linear_ordered_comm_ring ?x_85 ?x_86 | |
| [class_instances] (11) ?x_86 : decidable_linear_ordered_comm_ring G := real.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (11) ?x_86 : decidable_linear_ordered_comm_ring G := rat.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (11) ?x_86 : decidable_linear_ordered_comm_ring G := int.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (11) ?x_86 : decidable_linear_ordered_comm_ring G := @discrete_linear_ordered_field.to_decidable_linear_ordered_comm_ring ?x_87 ?x_88 | |
| [class_instances] (12) ?x_88 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (12) ?x_88 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (11) ?x_86 : decidable_linear_ordered_comm_ring G := @linear_nonneg_ring.to_decidable_linear_ordered_comm_ring ?x_87 ?x_88 ?x_89 ?x_90 | |
| [class_instances] (7) ?x_23 : comm_ring G := @field.to_comm_ring ?x_24 ?x_25 | |
| [class_instances] (8) ?x_25 : field G := real.field | |
| failed is_def_eq | |
| [class_instances] (8) ?x_25 : field G := rat.field | |
| failed is_def_eq | |
| [class_instances] (8) ?x_25 : field G := @linear_ordered_field.to_field ?x_26 ?x_27 | |
| [class_instances] (9) ?x_27 : linear_ordered_field G := real.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (9) ?x_27 : linear_ordered_field G := rat.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (9) ?x_27 : linear_ordered_field G := @discrete_linear_ordered_field.to_linear_ordered_field ?x_28 ?x_29 | |
| [class_instances] (10) ?x_29 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (10) ?x_29 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (8) ?x_25 : field G := @discrete_field.to_field ?x_26 ?x_27 | |
| [class_instances] (9) ?x_27 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (9) ?x_27 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (9) ?x_27 : discrete_field G := @local_ring.residue_field.discrete_field ?x_28 ?x_29 | |
| failed is_def_eq | |
| [class_instances] (9) ?x_27 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (9) ?x_27 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_30 ?x_31 | |
| [class_instances] (10) ?x_31 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (10) ?x_31 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (7) ?x_23 : comm_ring G := @integral_domain.to_comm_ring ?x_24 ?x_25 | |
| [class_instances] (8) ?x_25 : integral_domain G := real.integral_domain | |
| failed is_def_eq | |
| [class_instances] (8) ?x_25 : integral_domain G := @polynomial.integral_domain ?x_26 ?x_27 | |
| failed is_def_eq | |
| [class_instances] (8) ?x_25 : integral_domain G := @ideal.quotient.integral_domain ?x_28 ?x_29 ?x_30 ?x_31 | |
| failed is_def_eq | |
| [class_instances] (8) ?x_25 : integral_domain G := @subring.domain ?x_32 ?x_33 ?x_34 ?x_35 | |
| failed is_def_eq | |
| [class_instances] (8) ?x_25 : integral_domain G := rat.integral_domain | |
| failed is_def_eq | |
| [class_instances] (8) ?x_25 : integral_domain G := @principal_ideal_domain.to_integral_domain ?x_36 ?x_37 | |
| [class_instances] (9) ?x_37 : principal_ideal_domain G := @euclidean_domain.to_principal_ideal_domain ?x_38 ?x_39 | |
| [class_instances] (10) ?x_39 : euclidean_domain G := @polynomial.euclidean_domain ?x_40 ?x_41 | |
| failed is_def_eq | |
| [class_instances] (10) ?x_39 : euclidean_domain G := int.euclidean_domain | |
| failed is_def_eq | |
| [class_instances] (10) ?x_39 : euclidean_domain G := @discrete_field.to_euclidean_domain ?x_42 ?x_43 | |
| [class_instances] (11) ?x_43 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (11) ?x_43 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (11) ?x_43 : discrete_field G := @local_ring.residue_field.discrete_field ?x_44 ?x_45 | |
| failed is_def_eq | |
| [class_instances] (11) ?x_43 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (11) ?x_43 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_46 ?x_47 | |
| [class_instances] (12) ?x_47 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (12) ?x_47 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (8) ?x_25 : integral_domain G := @euclidean_domain.integral_domain ?x_26 ?x_27 | |
| [class_instances] (9) ?x_27 : euclidean_domain G := @polynomial.euclidean_domain ?x_28 ?x_29 | |
| failed is_def_eq | |
| [class_instances] (9) ?x_27 : euclidean_domain G := int.euclidean_domain | |
| failed is_def_eq | |
| [class_instances] (9) ?x_27 : euclidean_domain G := @discrete_field.to_euclidean_domain ?x_30 ?x_31 | |
| [class_instances] (10) ?x_31 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (10) ?x_31 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (10) ?x_31 : discrete_field G := @local_ring.residue_field.discrete_field ?x_32 ?x_33 | |
| failed is_def_eq | |
| [class_instances] (10) ?x_31 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (10) ?x_31 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_34 ?x_35 | |
| [class_instances] (11) ?x_35 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (11) ?x_35 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (8) ?x_25 : integral_domain G := @normalization_domain.to_integral_domain ?x_26 ?x_27 | |
| [class_instances] (9) ?x_27 : normalization_domain G := @polynomial.normalization_domain ?x_28 ?x_29 | |
| failed is_def_eq | |
| [class_instances] (9) ?x_27 : normalization_domain G := int.normalization_domain | |
| failed is_def_eq | |
| [class_instances] (9) ?x_27 : normalization_domain G := @gcd_domain.to_normalization_domain ?x_30 ?x_31 | |
| [class_instances] (10) ?x_31 : gcd_domain G := int.gcd_domain | |
| failed is_def_eq | |
| [class_instances] (8) ?x_25 : integral_domain G := @field.to_integral_domain ?x_26 ?x_27 | |
| [class_instances] (9) ?x_27 : field G := real.field | |
| failed is_def_eq | |
| [class_instances] (9) ?x_27 : field G := rat.field | |
| failed is_def_eq | |
| [class_instances] (9) ?x_27 : field G := @linear_ordered_field.to_field ?x_28 ?x_29 | |
| [class_instances] (10) ?x_29 : linear_ordered_field G := real.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (10) ?x_29 : linear_ordered_field G := rat.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (10) ?x_29 : linear_ordered_field G := @discrete_linear_ordered_field.to_linear_ordered_field ?x_30 ?x_31 | |
| [class_instances] (11) ?x_31 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (11) ?x_31 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (9) ?x_27 : field G := @discrete_field.to_field ?x_28 ?x_29 | |
| [class_instances] (10) ?x_29 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (10) ?x_29 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (10) ?x_29 : discrete_field G := @local_ring.residue_field.discrete_field ?x_30 ?x_31 | |
| failed is_def_eq | |
| [class_instances] (10) ?x_29 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (10) ?x_29 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_32 ?x_33 | |
| [class_instances] (11) ?x_33 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (11) ?x_33 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (8) ?x_25 : integral_domain G := @discrete_field.to_integral_domain ?x_26 ?x_27 ?x_28 | |
| [class_instances] (9) ?x_27 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (9) ?x_27 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (9) ?x_27 : discrete_field G := @local_ring.residue_field.discrete_field ?x_29 ?x_30 | |
| failed is_def_eq | |
| [class_instances] (9) ?x_27 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (9) ?x_27 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_31 ?x_32 | |
| [class_instances] (10) ?x_32 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (10) ?x_32 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (8) ?x_25 : integral_domain G := @linear_ordered_comm_ring.to_integral_domain ?x_26 ?x_27 | |
| [class_instances] (9) ?x_27 : linear_ordered_comm_ring G := real.linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (9) ?x_27 : linear_ordered_comm_ring G := rat.linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (9) ?x_27 : linear_ordered_comm_ring G := @decidable_linear_ordered_comm_ring.to_linear_ordered_comm_ring ?x_28 ?x_29 | |
| [class_instances] (10) ?x_29 : decidable_linear_ordered_comm_ring G := real.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (10) ?x_29 : decidable_linear_ordered_comm_ring G := rat.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (10) ?x_29 : decidable_linear_ordered_comm_ring G := int.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (10) ?x_29 : decidable_linear_ordered_comm_ring G := @discrete_linear_ordered_field.to_decidable_linear_ordered_comm_ring ?x_30 ?x_31 | |
| [class_instances] (11) ?x_31 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (11) ?x_31 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (10) ?x_29 : decidable_linear_ordered_comm_ring G := @linear_nonneg_ring.to_decidable_linear_ordered_comm_ring ?x_30 ?x_31 ?x_32 ?x_33 | |
| [class_instances] (6) ?x_21 : _root_.reversible G := @ @_root_.reversible_of_reduced ?x_22 ?x_23 | |
| [class_instances] (6) ?x_21 : _root_.reversible G := @ @_root_.reversible_of_domain ?x_22 ?x_23 | |
| [class_instances] (7) ?x_23 : domain G := real.domain | |
| failed is_def_eq | |
| [class_instances] (7) ?x_23 : domain G := @division_ring.to_domain ?x_24 ?x_25 | |
| [class_instances] (8) ?x_25 : division_ring G := real.division_ring | |
| failed is_def_eq | |
| [class_instances] (8) ?x_25 : division_ring G := rat.division_ring | |
| failed is_def_eq | |
| [class_instances] (8) ?x_25 : division_ring G := @field.to_division_ring ?x_26 ?x_27 | |
| [class_instances] (9) ?x_27 : field G := real.field | |
| failed is_def_eq | |
| [class_instances] (9) ?x_27 : field G := rat.field | |
| failed is_def_eq | |
| [class_instances] (9) ?x_27 : field G := @linear_ordered_field.to_field ?x_28 ?x_29 | |
| [class_instances] (10) ?x_29 : linear_ordered_field G := real.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (10) ?x_29 : linear_ordered_field G := rat.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (10) ?x_29 : linear_ordered_field G := @discrete_linear_ordered_field.to_linear_ordered_field ?x_30 ?x_31 | |
| [class_instances] (11) ?x_31 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (11) ?x_31 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (9) ?x_27 : field G := @discrete_field.to_field ?x_28 ?x_29 | |
| [class_instances] (10) ?x_29 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (10) ?x_29 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (10) ?x_29 : discrete_field G := @local_ring.residue_field.discrete_field ?x_30 ?x_31 | |
| failed is_def_eq | |
| [class_instances] (10) ?x_29 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (10) ?x_29 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_32 ?x_33 | |
| [class_instances] (11) ?x_33 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (11) ?x_33 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (7) ?x_23 : domain G := @linear_nonneg_ring.to_domain ?x_24 ?x_25 | |
| [class_instances] (7) ?x_23 : domain G := @linear_ordered_ring.to_domain ?x_24 ?x_25 | |
| [class_instances] (8) ?x_25 : linear_ordered_ring G := real.linear_ordered_ring | |
| failed is_def_eq | |
| [class_instances] (8) ?x_25 : linear_ordered_ring G := rat.linear_ordered_ring | |
| failed is_def_eq | |
| [class_instances] (8) ?x_25 : linear_ordered_ring G := @linear_ordered_field.to_linear_ordered_ring ?x_26 ?x_27 | |
| [class_instances] (9) ?x_27 : linear_ordered_field G := real.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (9) ?x_27 : linear_ordered_field G := rat.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (9) ?x_27 : linear_ordered_field G := @discrete_linear_ordered_field.to_linear_ordered_field ?x_28 ?x_29 | |
| [class_instances] (10) ?x_29 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (10) ?x_29 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (8) ?x_25 : linear_ordered_ring G := @linear_nonneg_ring.to_linear_ordered_ring ?x_26 ?x_27 | |
| [class_instances] (8) ?x_25 : linear_ordered_ring G := @linear_ordered_comm_ring.to_linear_ordered_ring ?x_26 ?x_27 | |
| [class_instances] (9) ?x_27 : linear_ordered_comm_ring G := real.linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (9) ?x_27 : linear_ordered_comm_ring G := rat.linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (9) ?x_27 : linear_ordered_comm_ring G := @decidable_linear_ordered_comm_ring.to_linear_ordered_comm_ring ?x_28 ?x_29 | |
| [class_instances] (10) ?x_29 : decidable_linear_ordered_comm_ring G := real.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (10) ?x_29 : decidable_linear_ordered_comm_ring G := rat.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (10) ?x_29 : decidable_linear_ordered_comm_ring G := int.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (10) ?x_29 : decidable_linear_ordered_comm_ring G := @discrete_linear_ordered_field.to_decidable_linear_ordered_comm_ring ?x_30 ?x_31 | |
| [class_instances] (11) ?x_31 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (11) ?x_31 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (10) ?x_29 : decidable_linear_ordered_comm_ring G := @linear_nonneg_ring.to_decidable_linear_ordered_comm_ring ?x_30 ?x_31 ?x_32 ?x_33 | |
| [class_instances] (7) ?x_23 : domain G := @integral_domain.to_domain ?x_24 ?x_25 | |
| [class_instances] (8) ?x_25 : integral_domain G := real.integral_domain | |
| failed is_def_eq | |
| [class_instances] (8) ?x_25 : integral_domain G := @polynomial.integral_domain ?x_26 ?x_27 | |
| failed is_def_eq | |
| [class_instances] (8) ?x_25 : integral_domain G := @ideal.quotient.integral_domain ?x_28 ?x_29 ?x_30 ?x_31 | |
| failed is_def_eq | |
| [class_instances] (8) ?x_25 : integral_domain G := @subring.domain ?x_32 ?x_33 ?x_34 ?x_35 | |
| failed is_def_eq | |
| [class_instances] (8) ?x_25 : integral_domain G := rat.integral_domain | |
| failed is_def_eq | |
| [class_instances] (8) ?x_25 : integral_domain G := @principal_ideal_domain.to_integral_domain ?x_36 ?x_37 | |
| [class_instances] (9) ?x_37 : principal_ideal_domain G := @euclidean_domain.to_principal_ideal_domain ?x_38 ?x_39 | |
| [class_instances] (10) ?x_39 : euclidean_domain G := @polynomial.euclidean_domain ?x_40 ?x_41 | |
| failed is_def_eq | |
| [class_instances] (10) ?x_39 : euclidean_domain G := int.euclidean_domain | |
| failed is_def_eq | |
| [class_instances] (10) ?x_39 : euclidean_domain G := @discrete_field.to_euclidean_domain ?x_42 ?x_43 | |
| [class_instances] (11) ?x_43 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (11) ?x_43 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (11) ?x_43 : discrete_field G := @local_ring.residue_field.discrete_field ?x_44 ?x_45 | |
| failed is_def_eq | |
| [class_instances] (11) ?x_43 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (11) ?x_43 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_46 ?x_47 | |
| [class_instances] (12) ?x_47 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (12) ?x_47 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (8) ?x_25 : integral_domain G := @euclidean_domain.integral_domain ?x_26 ?x_27 | |
| [class_instances] (9) ?x_27 : euclidean_domain G := @polynomial.euclidean_domain ?x_28 ?x_29 | |
| failed is_def_eq | |
| [class_instances] (9) ?x_27 : euclidean_domain G := int.euclidean_domain | |
| failed is_def_eq | |
| [class_instances] (9) ?x_27 : euclidean_domain G := @discrete_field.to_euclidean_domain ?x_30 ?x_31 | |
| [class_instances] (10) ?x_31 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (10) ?x_31 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (10) ?x_31 : discrete_field G := @local_ring.residue_field.discrete_field ?x_32 ?x_33 | |
| failed is_def_eq | |
| [class_instances] (10) ?x_31 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (10) ?x_31 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_34 ?x_35 | |
| [class_instances] (11) ?x_35 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (11) ?x_35 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (8) ?x_25 : integral_domain G := @normalization_domain.to_integral_domain ?x_26 ?x_27 | |
| [class_instances] (9) ?x_27 : normalization_domain G := @polynomial.normalization_domain ?x_28 ?x_29 | |
| failed is_def_eq | |
| [class_instances] (9) ?x_27 : normalization_domain G := int.normalization_domain | |
| failed is_def_eq | |
| [class_instances] (9) ?x_27 : normalization_domain G := @gcd_domain.to_normalization_domain ?x_30 ?x_31 | |
| [class_instances] (10) ?x_31 : gcd_domain G := int.gcd_domain | |
| failed is_def_eq | |
| [class_instances] (8) ?x_25 : integral_domain G := @field.to_integral_domain ?x_26 ?x_27 | |
| [class_instances] (9) ?x_27 : field G := real.field | |
| failed is_def_eq | |
| [class_instances] (9) ?x_27 : field G := rat.field | |
| failed is_def_eq | |
| [class_instances] (9) ?x_27 : field G := @linear_ordered_field.to_field ?x_28 ?x_29 | |
| [class_instances] (10) ?x_29 : linear_ordered_field G := real.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (10) ?x_29 : linear_ordered_field G := rat.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (10) ?x_29 : linear_ordered_field G := @discrete_linear_ordered_field.to_linear_ordered_field ?x_30 ?x_31 | |
| [class_instances] (11) ?x_31 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (11) ?x_31 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (9) ?x_27 : field G := @discrete_field.to_field ?x_28 ?x_29 | |
| [class_instances] (10) ?x_29 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (10) ?x_29 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (10) ?x_29 : discrete_field G := @local_ring.residue_field.discrete_field ?x_30 ?x_31 | |
| failed is_def_eq | |
| [class_instances] (10) ?x_29 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (10) ?x_29 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_32 ?x_33 | |
| [class_instances] (11) ?x_33 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (11) ?x_33 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (8) ?x_25 : integral_domain G := @discrete_field.to_integral_domain ?x_26 ?x_27 ?x_28 | |
| [class_instances] (9) ?x_27 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (9) ?x_27 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (9) ?x_27 : discrete_field G := @local_ring.residue_field.discrete_field ?x_29 ?x_30 | |
| failed is_def_eq | |
| [class_instances] (9) ?x_27 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (9) ?x_27 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_31 ?x_32 | |
| [class_instances] (10) ?x_32 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (10) ?x_32 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (8) ?x_25 : integral_domain G := @linear_ordered_comm_ring.to_integral_domain ?x_26 ?x_27 | |
| [class_instances] (9) ?x_27 : linear_ordered_comm_ring G := real.linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (9) ?x_27 : linear_ordered_comm_ring G := rat.linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (9) ?x_27 : linear_ordered_comm_ring G := @decidable_linear_ordered_comm_ring.to_linear_ordered_comm_ring ?x_28 ?x_29 | |
| [class_instances] (10) ?x_29 : decidable_linear_ordered_comm_ring G := real.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (10) ?x_29 : decidable_linear_ordered_comm_ring G := rat.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (10) ?x_29 : decidable_linear_ordered_comm_ring G := int.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (10) ?x_29 : decidable_linear_ordered_comm_ring G := @discrete_linear_ordered_field.to_decidable_linear_ordered_comm_ring ?x_30 ?x_31 | |
| [class_instances] (11) ?x_31 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (11) ?x_31 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (10) ?x_29 : decidable_linear_ordered_comm_ring G := @linear_nonneg_ring.to_decidable_linear_ordered_comm_ring ?x_30 ?x_31 ?x_32 ?x_33 | |
| [class_instances] (5) ?x_18 : ring G := @ @reduced.to_ring ?x_20 ?x_21 | |
| [class_instances] (5) ?x_18 : ring G := @dedekind_finite.to_ring ?x_20 ?x_21 | |
| [class_instances] (6) ?x_21 : dedekind_finite G := @pi.dedekind_finite ?x_22 ?x_23 ?x_24 | |
| failed is_def_eq | |
| [class_instances] (6) ?x_21 : dedekind_finite G := @ @_root_.dedekind_finite_of_noetherian ?x_25 ?x_26 ?x_27 | |
| [class_instances] (7) ?x_26 : ring G := @ @reversible.to_ring ?x_28 ?x_29 | |
| [class_instances] (8) ?x_29 : _root_.reversible G := @ @_root_.reversible_of_comm_ring ?x_30 ?x_31 | |
| [class_instances] (9) ?x_31 : comm_ring G := @subalgebra.comm_ring ?x_32 ?x_33 ?x_34 ?x_35 ?x_36 ?x_37 | |
| failed is_def_eq | |
| [class_instances] (9) ?x_31 : comm_ring G := @algebra.comap.comm_ring ?x_38 ?x_39 ?x_40 ?x_41 ?x_42 ?x_43 ?x_44 ?x_45 | |
| failed is_def_eq | |
| [class_instances] (9) ?x_31 : comm_ring G := complex.comm_ring | |
| failed is_def_eq | |
| [class_instances] (9) ?x_31 : comm_ring G := real.comm_ring | |
| failed is_def_eq | |
| [class_instances] (9) ?x_31 : comm_ring G := @cau_seq.completion.comm_ring ?x_46 ?x_47 ?x_48 ?x_49 ?x_50 ?x_51 | |
| failed is_def_eq | |
| [class_instances] (9) ?x_31 : comm_ring G := @cau_seq.comm_ring ?x_52 ?x_53 ?x_54 ?x_55 ?x_56 ?x_57 | |
| failed is_def_eq | |
| [class_instances] (9) ?x_31 : comm_ring G := @mv_polynomial.comm_ring ?x_58 ?x_59 ?x_60 | |
| failed is_def_eq | |
| [class_instances] (9) ?x_31 : comm_ring G := @polynomial.comm_ring ?x_61 ?x_62 | |
| failed is_def_eq | |
| [class_instances] (9) ?x_31 : comm_ring G := @free_abelian_group.comm_ring ?x_63 ?x_64 | |
| failed is_def_eq | |
| [class_instances] (9) ?x_31 : comm_ring G := @ideal.quotient.comm_ring ?x_65 ?x_66 ?x_67 | |
| failed is_def_eq | |
| [class_instances] (9) ?x_31 : comm_ring G := @finsupp.comm_ring ?x_68 ?x_69 ?x_70 ?x_71 | |
| failed is_def_eq | |
| [class_instances] (9) ?x_31 : comm_ring G := @prod.comm_ring ?x_72 ?x_73 ?x_74 ?x_75 | |
| failed is_def_eq | |
| [class_instances] (9) ?x_31 : comm_ring G := @pi.comm_ring ?x_76 ?x_77 ?x_78 | |
| failed is_def_eq | |
| [class_instances] (9) ?x_31 : comm_ring G := @subtype.comm_ring ?x_79 ?x_80 ?x_81 ?x_82 | |
| failed is_def_eq | |
| [class_instances] (9) ?x_31 : comm_ring G := @subset.comm_ring ?x_83 ?x_84 ?x_85 ?x_86 | |
| failed is_def_eq | |
| [class_instances] (9) ?x_31 : comm_ring G := rat.comm_ring | |
| failed is_def_eq | |
| [class_instances] (9) ?x_31 : comm_ring G := int.comm_ring | |
| failed is_def_eq | |
| [class_instances] (9) ?x_31 : comm_ring G := @nonzero_comm_ring.to_comm_ring ?x_87 ?x_88 | |
| [class_instances] (10) ?x_88 : nonzero_comm_ring G := real.nonzero_comm_ring | |
| failed is_def_eq | |
| [class_instances] (10) ?x_88 : nonzero_comm_ring G := @polynomial.nonzero_comm_ring ?x_89 ?x_90 | |
| failed is_def_eq | |
| [class_instances] (10) ?x_88 : nonzero_comm_ring G := @prod.nonzero_comm_ring ?x_91 ?x_92 ?x_93 ?x_94 | |
| failed is_def_eq | |
| [class_instances] (10) ?x_88 : nonzero_comm_ring G := rat.nonzero_comm_ring | |
| failed is_def_eq | |
| [class_instances] (10) ?x_88 : nonzero_comm_ring G := @euclidean_domain.to_nonzero_comm_ring ?x_95 ?x_96 | |
| [class_instances] (11) ?x_96 : euclidean_domain G := @polynomial.euclidean_domain ?x_97 ?x_98 | |
| failed is_def_eq | |
| [class_instances] (11) ?x_96 : euclidean_domain G := int.euclidean_domain | |
| failed is_def_eq | |
| [class_instances] (11) ?x_96 : euclidean_domain G := @discrete_field.to_euclidean_domain ?x_99 ?x_100 | |
| [class_instances] (12) ?x_100 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (12) ?x_100 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (12) ?x_100 : discrete_field G := @local_ring.residue_field.discrete_field ?x_101 ?x_102 | |
| failed is_def_eq | |
| [class_instances] (12) ?x_100 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (12) ?x_100 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_103 ?x_104 | |
| [class_instances] (13) ?x_104 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (13) ?x_104 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (10) ?x_88 : nonzero_comm_ring G := @local_ring.to_nonzero_comm_ring ?x_89 ?x_90 | |
| [class_instances] (11) ?x_90 : local_ring G := @discrete_field.local_ring ?x_91 ?x_92 | |
| [class_instances] (12) ?x_92 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (12) ?x_92 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (12) ?x_92 : discrete_field G := @local_ring.residue_field.discrete_field ?x_93 ?x_94 | |
| failed is_def_eq | |
| [class_instances] (12) ?x_92 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (12) ?x_92 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_95 ?x_96 | |
| [class_instances] (13) ?x_96 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (13) ?x_96 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (10) ?x_88 : nonzero_comm_ring G := @integral_domain.to_nonzero_comm_ring ?x_89 ?x_90 | |
| [class_instances] (11) ?x_90 : integral_domain G := real.integral_domain | |
| failed is_def_eq | |
| [class_instances] (11) ?x_90 : integral_domain G := @polynomial.integral_domain ?x_91 ?x_92 | |
| failed is_def_eq | |
| [class_instances] (11) ?x_90 : integral_domain G := @ideal.quotient.integral_domain ?x_93 ?x_94 ?x_95 ?x_96 | |
| failed is_def_eq | |
| [class_instances] (11) ?x_90 : integral_domain G := @subring.domain ?x_97 ?x_98 ?x_99 ?x_100 | |
| failed is_def_eq | |
| [class_instances] (11) ?x_90 : integral_domain G := rat.integral_domain | |
| failed is_def_eq | |
| [class_instances] (11) ?x_90 : integral_domain G := @principal_ideal_domain.to_integral_domain ?x_101 ?x_102 | |
| [class_instances] (12) ?x_102 : principal_ideal_domain G := @euclidean_domain.to_principal_ideal_domain ?x_103 ?x_104 | |
| [class_instances] (13) ?x_104 : euclidean_domain G := @polynomial.euclidean_domain ?x_105 ?x_106 | |
| failed is_def_eq | |
| [class_instances] (13) ?x_104 : euclidean_domain G := int.euclidean_domain | |
| failed is_def_eq | |
| [class_instances] (13) ?x_104 : euclidean_domain G := @discrete_field.to_euclidean_domain ?x_107 ?x_108 | |
| [class_instances] (14) ?x_108 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (14) ?x_108 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (14) ?x_108 : discrete_field G := @local_ring.residue_field.discrete_field ?x_109 ?x_110 | |
| failed is_def_eq | |
| [class_instances] (14) ?x_108 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (14) ?x_108 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_111 ?x_112 | |
| [class_instances] (15) ?x_112 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (15) ?x_112 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (11) ?x_90 : integral_domain G := @euclidean_domain.integral_domain ?x_91 ?x_92 | |
| [class_instances] (12) ?x_92 : euclidean_domain G := @polynomial.euclidean_domain ?x_93 ?x_94 | |
| failed is_def_eq | |
| [class_instances] (12) ?x_92 : euclidean_domain G := int.euclidean_domain | |
| failed is_def_eq | |
| [class_instances] (12) ?x_92 : euclidean_domain G := @discrete_field.to_euclidean_domain ?x_95 ?x_96 | |
| [class_instances] (13) ?x_96 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (13) ?x_96 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (13) ?x_96 : discrete_field G := @local_ring.residue_field.discrete_field ?x_97 ?x_98 | |
| failed is_def_eq | |
| [class_instances] (13) ?x_96 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (13) ?x_96 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_99 ?x_100 | |
| [class_instances] (14) ?x_100 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (14) ?x_100 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (11) ?x_90 : integral_domain G := @normalization_domain.to_integral_domain ?x_91 ?x_92 | |
| [class_instances] (12) ?x_92 : normalization_domain G := @polynomial.normalization_domain ?x_93 ?x_94 | |
| failed is_def_eq | |
| [class_instances] (12) ?x_92 : normalization_domain G := int.normalization_domain | |
| failed is_def_eq | |
| [class_instances] (12) ?x_92 : normalization_domain G := @gcd_domain.to_normalization_domain ?x_95 ?x_96 | |
| [class_instances] (13) ?x_96 : gcd_domain G := int.gcd_domain | |
| failed is_def_eq | |
| [class_instances] (11) ?x_90 : integral_domain G := @field.to_integral_domain ?x_91 ?x_92 | |
| [class_instances] (12) ?x_92 : field G := real.field | |
| failed is_def_eq | |
| [class_instances] (12) ?x_92 : field G := rat.field | |
| failed is_def_eq | |
| [class_instances] (12) ?x_92 : field G := @linear_ordered_field.to_field ?x_93 ?x_94 | |
| [class_instances] (13) ?x_94 : linear_ordered_field G := real.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (13) ?x_94 : linear_ordered_field G := rat.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (13) ?x_94 : linear_ordered_field G := @discrete_linear_ordered_field.to_linear_ordered_field ?x_95 ?x_96 | |
| [class_instances] (14) ?x_96 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (14) ?x_96 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (12) ?x_92 : field G := @discrete_field.to_field ?x_93 ?x_94 | |
| [class_instances] (13) ?x_94 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (13) ?x_94 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (13) ?x_94 : discrete_field G := @local_ring.residue_field.discrete_field ?x_95 ?x_96 | |
| failed is_def_eq | |
| [class_instances] (13) ?x_94 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (13) ?x_94 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_97 ?x_98 | |
| [class_instances] (14) ?x_98 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (14) ?x_98 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (11) ?x_90 : integral_domain G := @discrete_field.to_integral_domain ?x_91 ?x_92 ?x_93 | |
| [class_instances] (12) ?x_92 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (12) ?x_92 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (12) ?x_92 : discrete_field G := @local_ring.residue_field.discrete_field ?x_94 ?x_95 | |
| failed is_def_eq | |
| [class_instances] (12) ?x_92 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (12) ?x_92 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_96 ?x_97 | |
| [class_instances] (13) ?x_97 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (13) ?x_97 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (11) ?x_90 : integral_domain G := @linear_ordered_comm_ring.to_integral_domain ?x_91 ?x_92 | |
| [class_instances] (12) ?x_92 : linear_ordered_comm_ring G := real.linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (12) ?x_92 : linear_ordered_comm_ring G := rat.linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (12) ?x_92 : linear_ordered_comm_ring G := @decidable_linear_ordered_comm_ring.to_linear_ordered_comm_ring ?x_93 ?x_94 | |
| [class_instances] (13) ?x_94 : decidable_linear_ordered_comm_ring G := real.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (13) ?x_94 : decidable_linear_ordered_comm_ring G := rat.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (13) ?x_94 : decidable_linear_ordered_comm_ring G := int.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (13) ?x_94 : decidable_linear_ordered_comm_ring G := @discrete_linear_ordered_field.to_decidable_linear_ordered_comm_ring ?x_95 ?x_96 | |
| [class_instances] (14) ?x_96 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (14) ?x_96 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (13) ?x_94 : decidable_linear_ordered_comm_ring G := @linear_nonneg_ring.to_decidable_linear_ordered_comm_ring ?x_95 ?x_96 ?x_97 ?x_98 | |
| [class_instances] (9) ?x_31 : comm_ring G := @field.to_comm_ring ?x_32 ?x_33 | |
| [class_instances] (10) ?x_33 : field G := real.field | |
| failed is_def_eq | |
| [class_instances] (10) ?x_33 : field G := rat.field | |
| failed is_def_eq | |
| [class_instances] (10) ?x_33 : field G := @linear_ordered_field.to_field ?x_34 ?x_35 | |
| [class_instances] (11) ?x_35 : linear_ordered_field G := real.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (11) ?x_35 : linear_ordered_field G := rat.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (11) ?x_35 : linear_ordered_field G := @discrete_linear_ordered_field.to_linear_ordered_field ?x_36 ?x_37 | |
| [class_instances] (12) ?x_37 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (12) ?x_37 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (10) ?x_33 : field G := @discrete_field.to_field ?x_34 ?x_35 | |
| [class_instances] (11) ?x_35 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (11) ?x_35 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (11) ?x_35 : discrete_field G := @local_ring.residue_field.discrete_field ?x_36 ?x_37 | |
| failed is_def_eq | |
| [class_instances] (11) ?x_35 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (11) ?x_35 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_38 ?x_39 | |
| [class_instances] (12) ?x_39 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (12) ?x_39 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (9) ?x_31 : comm_ring G := @integral_domain.to_comm_ring ?x_32 ?x_33 | |
| [class_instances] (10) ?x_33 : integral_domain G := real.integral_domain | |
| failed is_def_eq | |
| [class_instances] (10) ?x_33 : integral_domain G := @polynomial.integral_domain ?x_34 ?x_35 | |
| failed is_def_eq | |
| [class_instances] (10) ?x_33 : integral_domain G := @ideal.quotient.integral_domain ?x_36 ?x_37 ?x_38 ?x_39 | |
| failed is_def_eq | |
| [class_instances] (10) ?x_33 : integral_domain G := @subring.domain ?x_40 ?x_41 ?x_42 ?x_43 | |
| failed is_def_eq | |
| [class_instances] (10) ?x_33 : integral_domain G := rat.integral_domain | |
| failed is_def_eq | |
| [class_instances] (10) ?x_33 : integral_domain G := @principal_ideal_domain.to_integral_domain ?x_44 ?x_45 | |
| [class_instances] (11) ?x_45 : principal_ideal_domain G := @euclidean_domain.to_principal_ideal_domain ?x_46 ?x_47 | |
| [class_instances] (12) ?x_47 : euclidean_domain G := @polynomial.euclidean_domain ?x_48 ?x_49 | |
| failed is_def_eq | |
| [class_instances] (12) ?x_47 : euclidean_domain G := int.euclidean_domain | |
| failed is_def_eq | |
| [class_instances] (12) ?x_47 : euclidean_domain G := @discrete_field.to_euclidean_domain ?x_50 ?x_51 | |
| [class_instances] (13) ?x_51 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (13) ?x_51 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (13) ?x_51 : discrete_field G := @local_ring.residue_field.discrete_field ?x_52 ?x_53 | |
| failed is_def_eq | |
| [class_instances] (13) ?x_51 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (13) ?x_51 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_54 ?x_55 | |
| [class_instances] (14) ?x_55 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (14) ?x_55 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (10) ?x_33 : integral_domain G := @euclidean_domain.integral_domain ?x_34 ?x_35 | |
| [class_instances] (11) ?x_35 : euclidean_domain G := @polynomial.euclidean_domain ?x_36 ?x_37 | |
| failed is_def_eq | |
| [class_instances] (11) ?x_35 : euclidean_domain G := int.euclidean_domain | |
| failed is_def_eq | |
| [class_instances] (11) ?x_35 : euclidean_domain G := @discrete_field.to_euclidean_domain ?x_38 ?x_39 | |
| [class_instances] (12) ?x_39 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (12) ?x_39 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (12) ?x_39 : discrete_field G := @local_ring.residue_field.discrete_field ?x_40 ?x_41 | |
| failed is_def_eq | |
| [class_instances] (12) ?x_39 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (12) ?x_39 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_42 ?x_43 | |
| [class_instances] (13) ?x_43 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (13) ?x_43 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (10) ?x_33 : integral_domain G := @normalization_domain.to_integral_domain ?x_34 ?x_35 | |
| [class_instances] (11) ?x_35 : normalization_domain G := @polynomial.normalization_domain ?x_36 ?x_37 | |
| failed is_def_eq | |
| [class_instances] (11) ?x_35 : normalization_domain G := int.normalization_domain | |
| failed is_def_eq | |
| [class_instances] (11) ?x_35 : normalization_domain G := @gcd_domain.to_normalization_domain ?x_38 ?x_39 | |
| [class_instances] (12) ?x_39 : gcd_domain G := int.gcd_domain | |
| failed is_def_eq | |
| [class_instances] (10) ?x_33 : integral_domain G := @field.to_integral_domain ?x_34 ?x_35 | |
| [class_instances] (11) ?x_35 : field G := real.field | |
| failed is_def_eq | |
| [class_instances] (11) ?x_35 : field G := rat.field | |
| failed is_def_eq | |
| [class_instances] (11) ?x_35 : field G := @linear_ordered_field.to_field ?x_36 ?x_37 | |
| [class_instances] (12) ?x_37 : linear_ordered_field G := real.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (12) ?x_37 : linear_ordered_field G := rat.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (12) ?x_37 : linear_ordered_field G := @discrete_linear_ordered_field.to_linear_ordered_field ?x_38 ?x_39 | |
| [class_instances] (13) ?x_39 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (13) ?x_39 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (11) ?x_35 : field G := @discrete_field.to_field ?x_36 ?x_37 | |
| [class_instances] (12) ?x_37 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (12) ?x_37 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (12) ?x_37 : discrete_field G := @local_ring.residue_field.discrete_field ?x_38 ?x_39 | |
| failed is_def_eq | |
| [class_instances] (12) ?x_37 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (12) ?x_37 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_40 ?x_41 | |
| [class_instances] (13) ?x_41 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (13) ?x_41 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (10) ?x_33 : integral_domain G := @discrete_field.to_integral_domain ?x_34 ?x_35 ?x_36 | |
| [class_instances] (11) ?x_35 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (11) ?x_35 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (11) ?x_35 : discrete_field G := @local_ring.residue_field.discrete_field ?x_37 ?x_38 | |
| failed is_def_eq | |
| [class_instances] (11) ?x_35 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (11) ?x_35 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_39 ?x_40 | |
| [class_instances] (12) ?x_40 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (12) ?x_40 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (10) ?x_33 : integral_domain G := @linear_ordered_comm_ring.to_integral_domain ?x_34 ?x_35 | |
| [class_instances] (11) ?x_35 : linear_ordered_comm_ring G := real.linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (11) ?x_35 : linear_ordered_comm_ring G := rat.linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (11) ?x_35 : linear_ordered_comm_ring G := @decidable_linear_ordered_comm_ring.to_linear_ordered_comm_ring ?x_36 ?x_37 | |
| [class_instances] (12) ?x_37 : decidable_linear_ordered_comm_ring G := real.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (12) ?x_37 : decidable_linear_ordered_comm_ring G := rat.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (12) ?x_37 : decidable_linear_ordered_comm_ring G := int.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (12) ?x_37 : decidable_linear_ordered_comm_ring G := @discrete_linear_ordered_field.to_decidable_linear_ordered_comm_ring ?x_38 ?x_39 | |
| [class_instances] (13) ?x_39 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (13) ?x_39 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (12) ?x_37 : decidable_linear_ordered_comm_ring G := @linear_nonneg_ring.to_decidable_linear_ordered_comm_ring ?x_38 ?x_39 ?x_40 ?x_41 | |
| [class_instances] (8) ?x_29 : _root_.reversible G := @ @_root_.reversible_of_reduced ?x_30 ?x_31 | |
| [class_instances] (8) ?x_29 : _root_.reversible G := @ @_root_.reversible_of_domain ?x_30 ?x_31 | |
| [class_instances] (9) ?x_31 : domain G := real.domain | |
| failed is_def_eq | |
| [class_instances] (9) ?x_31 : domain G := @division_ring.to_domain ?x_32 ?x_33 | |
| [class_instances] (10) ?x_33 : division_ring G := real.division_ring | |
| failed is_def_eq | |
| [class_instances] (10) ?x_33 : division_ring G := rat.division_ring | |
| failed is_def_eq | |
| [class_instances] (10) ?x_33 : division_ring G := @field.to_division_ring ?x_34 ?x_35 | |
| [class_instances] (11) ?x_35 : field G := real.field | |
| failed is_def_eq | |
| [class_instances] (11) ?x_35 : field G := rat.field | |
| failed is_def_eq | |
| [class_instances] (11) ?x_35 : field G := @linear_ordered_field.to_field ?x_36 ?x_37 | |
| [class_instances] (12) ?x_37 : linear_ordered_field G := real.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (12) ?x_37 : linear_ordered_field G := rat.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (12) ?x_37 : linear_ordered_field G := @discrete_linear_ordered_field.to_linear_ordered_field ?x_38 ?x_39 | |
| [class_instances] (13) ?x_39 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (13) ?x_39 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (11) ?x_35 : field G := @discrete_field.to_field ?x_36 ?x_37 | |
| [class_instances] (12) ?x_37 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (12) ?x_37 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (12) ?x_37 : discrete_field G := @local_ring.residue_field.discrete_field ?x_38 ?x_39 | |
| failed is_def_eq | |
| [class_instances] (12) ?x_37 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (12) ?x_37 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_40 ?x_41 | |
| [class_instances] (13) ?x_41 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (13) ?x_41 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (9) ?x_31 : domain G := @linear_nonneg_ring.to_domain ?x_32 ?x_33 | |
| [class_instances] (9) ?x_31 : domain G := @linear_ordered_ring.to_domain ?x_32 ?x_33 | |
| [class_instances] (10) ?x_33 : linear_ordered_ring G := real.linear_ordered_ring | |
| failed is_def_eq | |
| [class_instances] (10) ?x_33 : linear_ordered_ring G := rat.linear_ordered_ring | |
| failed is_def_eq | |
| [class_instances] (10) ?x_33 : linear_ordered_ring G := @linear_ordered_field.to_linear_ordered_ring ?x_34 ?x_35 | |
| [class_instances] (11) ?x_35 : linear_ordered_field G := real.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (11) ?x_35 : linear_ordered_field G := rat.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (11) ?x_35 : linear_ordered_field G := @discrete_linear_ordered_field.to_linear_ordered_field ?x_36 ?x_37 | |
| [class_instances] (12) ?x_37 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (12) ?x_37 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (10) ?x_33 : linear_ordered_ring G := @linear_nonneg_ring.to_linear_ordered_ring ?x_34 ?x_35 | |
| [class_instances] (10) ?x_33 : linear_ordered_ring G := @linear_ordered_comm_ring.to_linear_ordered_ring ?x_34 ?x_35 | |
| [class_instances] (11) ?x_35 : linear_ordered_comm_ring G := real.linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (11) ?x_35 : linear_ordered_comm_ring G := rat.linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (11) ?x_35 : linear_ordered_comm_ring G := @decidable_linear_ordered_comm_ring.to_linear_ordered_comm_ring ?x_36 ?x_37 | |
| [class_instances] (12) ?x_37 : decidable_linear_ordered_comm_ring G := real.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (12) ?x_37 : decidable_linear_ordered_comm_ring G := rat.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (12) ?x_37 : decidable_linear_ordered_comm_ring G := int.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (12) ?x_37 : decidable_linear_ordered_comm_ring G := @discrete_linear_ordered_field.to_decidable_linear_ordered_comm_ring ?x_38 ?x_39 | |
| [class_instances] (13) ?x_39 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (13) ?x_39 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (12) ?x_37 : decidable_linear_ordered_comm_ring G := @linear_nonneg_ring.to_decidable_linear_ordered_comm_ring ?x_38 ?x_39 ?x_40 ?x_41 | |
| [class_instances] (9) ?x_31 : domain G := @integral_domain.to_domain ?x_32 ?x_33 | |
| [class_instances] (10) ?x_33 : integral_domain G := real.integral_domain | |
| failed is_def_eq | |
| [class_instances] (10) ?x_33 : integral_domain G := @polynomial.integral_domain ?x_34 ?x_35 | |
| failed is_def_eq | |
| [class_instances] (10) ?x_33 : integral_domain G := @ideal.quotient.integral_domain ?x_36 ?x_37 ?x_38 ?x_39 | |
| failed is_def_eq | |
| [class_instances] (10) ?x_33 : integral_domain G := @subring.domain ?x_40 ?x_41 ?x_42 ?x_43 | |
| failed is_def_eq | |
| [class_instances] (10) ?x_33 : integral_domain G := rat.integral_domain | |
| failed is_def_eq | |
| [class_instances] (10) ?x_33 : integral_domain G := @principal_ideal_domain.to_integral_domain ?x_44 ?x_45 | |
| [class_instances] (11) ?x_45 : principal_ideal_domain G := @euclidean_domain.to_principal_ideal_domain ?x_46 ?x_47 | |
| [class_instances] (12) ?x_47 : euclidean_domain G := @polynomial.euclidean_domain ?x_48 ?x_49 | |
| failed is_def_eq | |
| [class_instances] (12) ?x_47 : euclidean_domain G := int.euclidean_domain | |
| failed is_def_eq | |
| [class_instances] (12) ?x_47 : euclidean_domain G := @discrete_field.to_euclidean_domain ?x_50 ?x_51 | |
| [class_instances] (13) ?x_51 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (13) ?x_51 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (13) ?x_51 : discrete_field G := @local_ring.residue_field.discrete_field ?x_52 ?x_53 | |
| failed is_def_eq | |
| [class_instances] (13) ?x_51 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (13) ?x_51 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_54 ?x_55 | |
| [class_instances] (14) ?x_55 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (14) ?x_55 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (10) ?x_33 : integral_domain G := @euclidean_domain.integral_domain ?x_34 ?x_35 | |
| [class_instances] (11) ?x_35 : euclidean_domain G := @polynomial.euclidean_domain ?x_36 ?x_37 | |
| failed is_def_eq | |
| [class_instances] (11) ?x_35 : euclidean_domain G := int.euclidean_domain | |
| failed is_def_eq | |
| [class_instances] (11) ?x_35 : euclidean_domain G := @discrete_field.to_euclidean_domain ?x_38 ?x_39 | |
| [class_instances] (12) ?x_39 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (12) ?x_39 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (12) ?x_39 : discrete_field G := @local_ring.residue_field.discrete_field ?x_40 ?x_41 | |
| failed is_def_eq | |
| [class_instances] (12) ?x_39 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (12) ?x_39 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_42 ?x_43 | |
| [class_instances] (13) ?x_43 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (13) ?x_43 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (10) ?x_33 : integral_domain G := @normalization_domain.to_integral_domain ?x_34 ?x_35 | |
| [class_instances] (11) ?x_35 : normalization_domain G := @polynomial.normalization_domain ?x_36 ?x_37 | |
| failed is_def_eq | |
| [class_instances] (11) ?x_35 : normalization_domain G := int.normalization_domain | |
| failed is_def_eq | |
| [class_instances] (11) ?x_35 : normalization_domain G := @gcd_domain.to_normalization_domain ?x_38 ?x_39 | |
| [class_instances] (12) ?x_39 : gcd_domain G := int.gcd_domain | |
| failed is_def_eq | |
| [class_instances] (10) ?x_33 : integral_domain G := @field.to_integral_domain ?x_34 ?x_35 | |
| [class_instances] (11) ?x_35 : field G := real.field | |
| failed is_def_eq | |
| [class_instances] (11) ?x_35 : field G := rat.field | |
| failed is_def_eq | |
| [class_instances] (11) ?x_35 : field G := @linear_ordered_field.to_field ?x_36 ?x_37 | |
| [class_instances] (12) ?x_37 : linear_ordered_field G := real.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (12) ?x_37 : linear_ordered_field G := rat.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (12) ?x_37 : linear_ordered_field G := @discrete_linear_ordered_field.to_linear_ordered_field ?x_38 ?x_39 | |
| [class_instances] (13) ?x_39 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (13) ?x_39 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (11) ?x_35 : field G := @discrete_field.to_field ?x_36 ?x_37 | |
| [class_instances] (12) ?x_37 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (12) ?x_37 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (12) ?x_37 : discrete_field G := @local_ring.residue_field.discrete_field ?x_38 ?x_39 | |
| failed is_def_eq | |
| [class_instances] (12) ?x_37 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (12) ?x_37 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_40 ?x_41 | |
| [class_instances] (13) ?x_41 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (13) ?x_41 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (10) ?x_33 : integral_domain G := @discrete_field.to_integral_domain ?x_34 ?x_35 ?x_36 | |
| [class_instances] (11) ?x_35 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (11) ?x_35 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (11) ?x_35 : discrete_field G := @local_ring.residue_field.discrete_field ?x_37 ?x_38 | |
| failed is_def_eq | |
| [class_instances] (11) ?x_35 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (11) ?x_35 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_39 ?x_40 | |
| [class_instances] (12) ?x_40 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (12) ?x_40 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (10) ?x_33 : integral_domain G := @linear_ordered_comm_ring.to_integral_domain ?x_34 ?x_35 | |
| [class_instances] (11) ?x_35 : linear_ordered_comm_ring G := real.linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (11) ?x_35 : linear_ordered_comm_ring G := rat.linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (11) ?x_35 : linear_ordered_comm_ring G := @decidable_linear_ordered_comm_ring.to_linear_ordered_comm_ring ?x_36 ?x_37 | |
| [class_instances] (12) ?x_37 : decidable_linear_ordered_comm_ring G := real.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (12) ?x_37 : decidable_linear_ordered_comm_ring G := rat.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (12) ?x_37 : decidable_linear_ordered_comm_ring G := int.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (12) ?x_37 : decidable_linear_ordered_comm_ring G := @discrete_linear_ordered_field.to_decidable_linear_ordered_comm_ring ?x_38 ?x_39 | |
| [class_instances] (13) ?x_39 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (13) ?x_39 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (12) ?x_37 : decidable_linear_ordered_comm_ring G := @linear_nonneg_ring.to_decidable_linear_ordered_comm_ring ?x_38 ?x_39 ?x_40 ?x_41 | |
| [class_instances] (7) ?x_26 : ring G := @ @reduced.to_ring ?x_28 ?x_29 | |
| [class_instances] (7) ?x_26 : ring G := @dedekind_finite.to_ring ?x_28 ?x_29 | |
| [class_instances] (8) ?x_29 : dedekind_finite G := @pi.dedekind_finite ?x_30 ?x_31 ?x_32 | |
| failed is_def_eq | |
| [class_instances] (8) ?x_29 : dedekind_finite G := @ @_root_.dedekind_finite_of_noetherian ?x_33 ?x_34 ?x_35 | |
| [class_instances] (9) ?x_34 : ring G := @ @reversible.to_ring ?x_36 ?x_37 | |
| [class_instances] (10) ?x_37 : _root_.reversible G := @ @_root_.reversible_of_comm_ring ?x_38 ?x_39 | |
| [class_instances] (11) ?x_39 : comm_ring G := @subalgebra.comm_ring ?x_40 ?x_41 ?x_42 ?x_43 ?x_44 ?x_45 | |
| failed is_def_eq | |
| [class_instances] (11) ?x_39 : comm_ring G := @algebra.comap.comm_ring ?x_46 ?x_47 ?x_48 ?x_49 ?x_50 ?x_51 ?x_52 ?x_53 | |
| failed is_def_eq | |
| [class_instances] (11) ?x_39 : comm_ring G := complex.comm_ring | |
| failed is_def_eq | |
| [class_instances] (11) ?x_39 : comm_ring G := real.comm_ring | |
| failed is_def_eq | |
| [class_instances] (11) ?x_39 : comm_ring G := @cau_seq.completion.comm_ring ?x_54 ?x_55 ?x_56 ?x_57 ?x_58 ?x_59 | |
| failed is_def_eq | |
| [class_instances] (11) ?x_39 : comm_ring G := @cau_seq.comm_ring ?x_60 ?x_61 ?x_62 ?x_63 ?x_64 ?x_65 | |
| failed is_def_eq | |
| [class_instances] (11) ?x_39 : comm_ring G := @mv_polynomial.comm_ring ?x_66 ?x_67 ?x_68 | |
| failed is_def_eq | |
| [class_instances] (11) ?x_39 : comm_ring G := @polynomial.comm_ring ?x_69 ?x_70 | |
| failed is_def_eq | |
| [class_instances] (11) ?x_39 : comm_ring G := @free_abelian_group.comm_ring ?x_71 ?x_72 | |
| failed is_def_eq | |
| [class_instances] (11) ?x_39 : comm_ring G := @ideal.quotient.comm_ring ?x_73 ?x_74 ?x_75 | |
| failed is_def_eq | |
| [class_instances] (11) ?x_39 : comm_ring G := @finsupp.comm_ring ?x_76 ?x_77 ?x_78 ?x_79 | |
| failed is_def_eq | |
| [class_instances] (11) ?x_39 : comm_ring G := @prod.comm_ring ?x_80 ?x_81 ?x_82 ?x_83 | |
| failed is_def_eq | |
| [class_instances] (11) ?x_39 : comm_ring G := @pi.comm_ring ?x_84 ?x_85 ?x_86 | |
| failed is_def_eq | |
| [class_instances] (11) ?x_39 : comm_ring G := @subtype.comm_ring ?x_87 ?x_88 ?x_89 ?x_90 | |
| failed is_def_eq | |
| [class_instances] (11) ?x_39 : comm_ring G := @subset.comm_ring ?x_91 ?x_92 ?x_93 ?x_94 | |
| failed is_def_eq | |
| [class_instances] (11) ?x_39 : comm_ring G := rat.comm_ring | |
| failed is_def_eq | |
| [class_instances] (11) ?x_39 : comm_ring G := int.comm_ring | |
| failed is_def_eq | |
| [class_instances] (11) ?x_39 : comm_ring G := @nonzero_comm_ring.to_comm_ring ?x_95 ?x_96 | |
| [class_instances] (12) ?x_96 : nonzero_comm_ring G := real.nonzero_comm_ring | |
| failed is_def_eq | |
| [class_instances] (12) ?x_96 : nonzero_comm_ring G := @polynomial.nonzero_comm_ring ?x_97 ?x_98 | |
| failed is_def_eq | |
| [class_instances] (12) ?x_96 : nonzero_comm_ring G := @prod.nonzero_comm_ring ?x_99 ?x_100 ?x_101 ?x_102 | |
| failed is_def_eq | |
| [class_instances] (12) ?x_96 : nonzero_comm_ring G := rat.nonzero_comm_ring | |
| failed is_def_eq | |
| [class_instances] (12) ?x_96 : nonzero_comm_ring G := @euclidean_domain.to_nonzero_comm_ring ?x_103 ?x_104 | |
| [class_instances] (13) ?x_104 : euclidean_domain G := @polynomial.euclidean_domain ?x_105 ?x_106 | |
| failed is_def_eq | |
| [class_instances] (13) ?x_104 : euclidean_domain G := int.euclidean_domain | |
| failed is_def_eq | |
| [class_instances] (13) ?x_104 : euclidean_domain G := @discrete_field.to_euclidean_domain ?x_107 ?x_108 | |
| [class_instances] (14) ?x_108 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (14) ?x_108 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (14) ?x_108 : discrete_field G := @local_ring.residue_field.discrete_field ?x_109 ?x_110 | |
| failed is_def_eq | |
| [class_instances] (14) ?x_108 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (14) ?x_108 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_111 ?x_112 | |
| [class_instances] (15) ?x_112 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (15) ?x_112 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (12) ?x_96 : nonzero_comm_ring G := @local_ring.to_nonzero_comm_ring ?x_97 ?x_98 | |
| [class_instances] (13) ?x_98 : local_ring G := @discrete_field.local_ring ?x_99 ?x_100 | |
| [class_instances] (14) ?x_100 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (14) ?x_100 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (14) ?x_100 : discrete_field G := @local_ring.residue_field.discrete_field ?x_101 ?x_102 | |
| failed is_def_eq | |
| [class_instances] (14) ?x_100 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (14) ?x_100 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_103 ?x_104 | |
| [class_instances] (15) ?x_104 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (15) ?x_104 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (12) ?x_96 : nonzero_comm_ring G := @integral_domain.to_nonzero_comm_ring ?x_97 ?x_98 | |
| [class_instances] (13) ?x_98 : integral_domain G := real.integral_domain | |
| failed is_def_eq | |
| [class_instances] (13) ?x_98 : integral_domain G := @polynomial.integral_domain ?x_99 ?x_100 | |
| failed is_def_eq | |
| [class_instances] (13) ?x_98 : integral_domain G := @ideal.quotient.integral_domain ?x_101 ?x_102 ?x_103 ?x_104 | |
| failed is_def_eq | |
| [class_instances] (13) ?x_98 : integral_domain G := @subring.domain ?x_105 ?x_106 ?x_107 ?x_108 | |
| failed is_def_eq | |
| [class_instances] (13) ?x_98 : integral_domain G := rat.integral_domain | |
| failed is_def_eq | |
| [class_instances] (13) ?x_98 : integral_domain G := @principal_ideal_domain.to_integral_domain ?x_109 ?x_110 | |
| [class_instances] (14) ?x_110 : principal_ideal_domain G := @euclidean_domain.to_principal_ideal_domain ?x_111 ?x_112 | |
| [class_instances] (15) ?x_112 : euclidean_domain G := @polynomial.euclidean_domain ?x_113 ?x_114 | |
| failed is_def_eq | |
| [class_instances] (15) ?x_112 : euclidean_domain G := int.euclidean_domain | |
| failed is_def_eq | |
| [class_instances] (15) ?x_112 : euclidean_domain G := @discrete_field.to_euclidean_domain ?x_115 ?x_116 | |
| [class_instances] (16) ?x_116 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (16) ?x_116 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (16) ?x_116 : discrete_field G := @local_ring.residue_field.discrete_field ?x_117 ?x_118 | |
| failed is_def_eq | |
| [class_instances] (16) ?x_116 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (16) ?x_116 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_119 ?x_120 | |
| [class_instances] (17) ?x_120 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (17) ?x_120 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (13) ?x_98 : integral_domain G := @euclidean_domain.integral_domain ?x_99 ?x_100 | |
| [class_instances] (14) ?x_100 : euclidean_domain G := @polynomial.euclidean_domain ?x_101 ?x_102 | |
| failed is_def_eq | |
| [class_instances] (14) ?x_100 : euclidean_domain G := int.euclidean_domain | |
| failed is_def_eq | |
| [class_instances] (14) ?x_100 : euclidean_domain G := @discrete_field.to_euclidean_domain ?x_103 ?x_104 | |
| [class_instances] (15) ?x_104 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (15) ?x_104 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (15) ?x_104 : discrete_field G := @local_ring.residue_field.discrete_field ?x_105 ?x_106 | |
| failed is_def_eq | |
| [class_instances] (15) ?x_104 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (15) ?x_104 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_107 ?x_108 | |
| [class_instances] (16) ?x_108 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (16) ?x_108 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (13) ?x_98 : integral_domain G := @normalization_domain.to_integral_domain ?x_99 ?x_100 | |
| [class_instances] (14) ?x_100 : normalization_domain G := @polynomial.normalization_domain ?x_101 ?x_102 | |
| failed is_def_eq | |
| [class_instances] (14) ?x_100 : normalization_domain G := int.normalization_domain | |
| failed is_def_eq | |
| [class_instances] (14) ?x_100 : normalization_domain G := @gcd_domain.to_normalization_domain ?x_103 ?x_104 | |
| [class_instances] (15) ?x_104 : gcd_domain G := int.gcd_domain | |
| failed is_def_eq | |
| [class_instances] (13) ?x_98 : integral_domain G := @field.to_integral_domain ?x_99 ?x_100 | |
| [class_instances] (14) ?x_100 : field G := real.field | |
| failed is_def_eq | |
| [class_instances] (14) ?x_100 : field G := rat.field | |
| failed is_def_eq | |
| [class_instances] (14) ?x_100 : field G := @linear_ordered_field.to_field ?x_101 ?x_102 | |
| [class_instances] (15) ?x_102 : linear_ordered_field G := real.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (15) ?x_102 : linear_ordered_field G := rat.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (15) ?x_102 : linear_ordered_field G := @discrete_linear_ordered_field.to_linear_ordered_field ?x_103 ?x_104 | |
| [class_instances] (16) ?x_104 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (16) ?x_104 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (14) ?x_100 : field G := @discrete_field.to_field ?x_101 ?x_102 | |
| [class_instances] (15) ?x_102 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (15) ?x_102 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (15) ?x_102 : discrete_field G := @local_ring.residue_field.discrete_field ?x_103 ?x_104 | |
| failed is_def_eq | |
| [class_instances] (15) ?x_102 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (15) ?x_102 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_105 ?x_106 | |
| [class_instances] (16) ?x_106 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (16) ?x_106 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (13) ?x_98 : integral_domain G := @discrete_field.to_integral_domain ?x_99 ?x_100 ?x_101 | |
| [class_instances] (14) ?x_100 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (14) ?x_100 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (14) ?x_100 : discrete_field G := @local_ring.residue_field.discrete_field ?x_102 ?x_103 | |
| failed is_def_eq | |
| [class_instances] (14) ?x_100 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (14) ?x_100 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_104 ?x_105 | |
| [class_instances] (15) ?x_105 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (15) ?x_105 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (13) ?x_98 : integral_domain G := @linear_ordered_comm_ring.to_integral_domain ?x_99 ?x_100 | |
| [class_instances] (14) ?x_100 : linear_ordered_comm_ring G := real.linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (14) ?x_100 : linear_ordered_comm_ring G := rat.linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (14) ?x_100 : linear_ordered_comm_ring G := @decidable_linear_ordered_comm_ring.to_linear_ordered_comm_ring ?x_101 ?x_102 | |
| [class_instances] (15) ?x_102 : decidable_linear_ordered_comm_ring G := real.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (15) ?x_102 : decidable_linear_ordered_comm_ring G := rat.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (15) ?x_102 : decidable_linear_ordered_comm_ring G := int.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (15) ?x_102 : decidable_linear_ordered_comm_ring G := @discrete_linear_ordered_field.to_decidable_linear_ordered_comm_ring ?x_103 ?x_104 | |
| [class_instances] (16) ?x_104 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (16) ?x_104 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (15) ?x_102 : decidable_linear_ordered_comm_ring G := @linear_nonneg_ring.to_decidable_linear_ordered_comm_ring ?x_103 ?x_104 ?x_105 ?x_106 | |
| [class_instances] (11) ?x_39 : comm_ring G := @field.to_comm_ring ?x_40 ?x_41 | |
| [class_instances] (12) ?x_41 : field G := real.field | |
| failed is_def_eq | |
| [class_instances] (12) ?x_41 : field G := rat.field | |
| failed is_def_eq | |
| [class_instances] (12) ?x_41 : field G := @linear_ordered_field.to_field ?x_42 ?x_43 | |
| [class_instances] (13) ?x_43 : linear_ordered_field G := real.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (13) ?x_43 : linear_ordered_field G := rat.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (13) ?x_43 : linear_ordered_field G := @discrete_linear_ordered_field.to_linear_ordered_field ?x_44 ?x_45 | |
| [class_instances] (14) ?x_45 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (14) ?x_45 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (12) ?x_41 : field G := @discrete_field.to_field ?x_42 ?x_43 | |
| [class_instances] (13) ?x_43 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (13) ?x_43 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (13) ?x_43 : discrete_field G := @local_ring.residue_field.discrete_field ?x_44 ?x_45 | |
| failed is_def_eq | |
| [class_instances] (13) ?x_43 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (13) ?x_43 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_46 ?x_47 | |
| [class_instances] (14) ?x_47 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (14) ?x_47 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (11) ?x_39 : comm_ring G := @integral_domain.to_comm_ring ?x_40 ?x_41 | |
| [class_instances] (12) ?x_41 : integral_domain G := real.integral_domain | |
| failed is_def_eq | |
| [class_instances] (12) ?x_41 : integral_domain G := @polynomial.integral_domain ?x_42 ?x_43 | |
| failed is_def_eq | |
| [class_instances] (12) ?x_41 : integral_domain G := @ideal.quotient.integral_domain ?x_44 ?x_45 ?x_46 ?x_47 | |
| failed is_def_eq | |
| [class_instances] (12) ?x_41 : integral_domain G := @subring.domain ?x_48 ?x_49 ?x_50 ?x_51 | |
| failed is_def_eq | |
| [class_instances] (12) ?x_41 : integral_domain G := rat.integral_domain | |
| failed is_def_eq | |
| [class_instances] (12) ?x_41 : integral_domain G := @principal_ideal_domain.to_integral_domain ?x_52 ?x_53 | |
| [class_instances] (13) ?x_53 : principal_ideal_domain G := @euclidean_domain.to_principal_ideal_domain ?x_54 ?x_55 | |
| [class_instances] (14) ?x_55 : euclidean_domain G := @polynomial.euclidean_domain ?x_56 ?x_57 | |
| failed is_def_eq | |
| [class_instances] (14) ?x_55 : euclidean_domain G := int.euclidean_domain | |
| failed is_def_eq | |
| [class_instances] (14) ?x_55 : euclidean_domain G := @discrete_field.to_euclidean_domain ?x_58 ?x_59 | |
| [class_instances] (15) ?x_59 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (15) ?x_59 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (15) ?x_59 : discrete_field G := @local_ring.residue_field.discrete_field ?x_60 ?x_61 | |
| failed is_def_eq | |
| [class_instances] (15) ?x_59 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (15) ?x_59 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_62 ?x_63 | |
| [class_instances] (16) ?x_63 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (16) ?x_63 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (12) ?x_41 : integral_domain G := @euclidean_domain.integral_domain ?x_42 ?x_43 | |
| [class_instances] (13) ?x_43 : euclidean_domain G := @polynomial.euclidean_domain ?x_44 ?x_45 | |
| failed is_def_eq | |
| [class_instances] (13) ?x_43 : euclidean_domain G := int.euclidean_domain | |
| failed is_def_eq | |
| [class_instances] (13) ?x_43 : euclidean_domain G := @discrete_field.to_euclidean_domain ?x_46 ?x_47 | |
| [class_instances] (14) ?x_47 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (14) ?x_47 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (14) ?x_47 : discrete_field G := @local_ring.residue_field.discrete_field ?x_48 ?x_49 | |
| failed is_def_eq | |
| [class_instances] (14) ?x_47 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (14) ?x_47 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_50 ?x_51 | |
| [class_instances] (15) ?x_51 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (15) ?x_51 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (12) ?x_41 : integral_domain G := @normalization_domain.to_integral_domain ?x_42 ?x_43 | |
| [class_instances] (13) ?x_43 : normalization_domain G := @polynomial.normalization_domain ?x_44 ?x_45 | |
| failed is_def_eq | |
| [class_instances] (13) ?x_43 : normalization_domain G := int.normalization_domain | |
| failed is_def_eq | |
| [class_instances] (13) ?x_43 : normalization_domain G := @gcd_domain.to_normalization_domain ?x_46 ?x_47 | |
| [class_instances] (14) ?x_47 : gcd_domain G := int.gcd_domain | |
| failed is_def_eq | |
| [class_instances] (12) ?x_41 : integral_domain G := @field.to_integral_domain ?x_42 ?x_43 | |
| [class_instances] (13) ?x_43 : field G := real.field | |
| failed is_def_eq | |
| [class_instances] (13) ?x_43 : field G := rat.field | |
| failed is_def_eq | |
| [class_instances] (13) ?x_43 : field G := @linear_ordered_field.to_field ?x_44 ?x_45 | |
| [class_instances] (14) ?x_45 : linear_ordered_field G := real.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (14) ?x_45 : linear_ordered_field G := rat.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (14) ?x_45 : linear_ordered_field G := @discrete_linear_ordered_field.to_linear_ordered_field ?x_46 ?x_47 | |
| [class_instances] (15) ?x_47 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (15) ?x_47 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (13) ?x_43 : field G := @discrete_field.to_field ?x_44 ?x_45 | |
| [class_instances] (14) ?x_45 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (14) ?x_45 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (14) ?x_45 : discrete_field G := @local_ring.residue_field.discrete_field ?x_46 ?x_47 | |
| failed is_def_eq | |
| [class_instances] (14) ?x_45 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (14) ?x_45 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_48 ?x_49 | |
| [class_instances] (15) ?x_49 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (15) ?x_49 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (12) ?x_41 : integral_domain G := @discrete_field.to_integral_domain ?x_42 ?x_43 ?x_44 | |
| [class_instances] (13) ?x_43 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (13) ?x_43 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (13) ?x_43 : discrete_field G := @local_ring.residue_field.discrete_field ?x_45 ?x_46 | |
| failed is_def_eq | |
| [class_instances] (13) ?x_43 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (13) ?x_43 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_47 ?x_48 | |
| [class_instances] (14) ?x_48 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (14) ?x_48 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (12) ?x_41 : integral_domain G := @linear_ordered_comm_ring.to_integral_domain ?x_42 ?x_43 | |
| [class_instances] (13) ?x_43 : linear_ordered_comm_ring G := real.linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (13) ?x_43 : linear_ordered_comm_ring G := rat.linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (13) ?x_43 : linear_ordered_comm_ring G := @decidable_linear_ordered_comm_ring.to_linear_ordered_comm_ring ?x_44 ?x_45 | |
| [class_instances] (14) ?x_45 : decidable_linear_ordered_comm_ring G := real.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (14) ?x_45 : decidable_linear_ordered_comm_ring G := rat.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (14) ?x_45 : decidable_linear_ordered_comm_ring G := int.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (14) ?x_45 : decidable_linear_ordered_comm_ring G := @discrete_linear_ordered_field.to_decidable_linear_ordered_comm_ring ?x_46 ?x_47 | |
| [class_instances] (15) ?x_47 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (15) ?x_47 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (14) ?x_45 : decidable_linear_ordered_comm_ring G := @linear_nonneg_ring.to_decidable_linear_ordered_comm_ring ?x_46 ?x_47 ?x_48 ?x_49 | |
| [class_instances] (10) ?x_37 : _root_.reversible G := @ @_root_.reversible_of_reduced ?x_38 ?x_39 | |
| [class_instances] (10) ?x_37 : _root_.reversible G := @ @_root_.reversible_of_domain ?x_38 ?x_39 | |
| [class_instances] (11) ?x_39 : domain G := real.domain | |
| failed is_def_eq | |
| [class_instances] (11) ?x_39 : domain G := @division_ring.to_domain ?x_40 ?x_41 | |
| [class_instances] (12) ?x_41 : division_ring G := real.division_ring | |
| failed is_def_eq | |
| [class_instances] (12) ?x_41 : division_ring G := rat.division_ring | |
| failed is_def_eq | |
| [class_instances] (12) ?x_41 : division_ring G := @field.to_division_ring ?x_42 ?x_43 | |
| [class_instances] (13) ?x_43 : field G := real.field | |
| failed is_def_eq | |
| [class_instances] (13) ?x_43 : field G := rat.field | |
| failed is_def_eq | |
| [class_instances] (13) ?x_43 : field G := @linear_ordered_field.to_field ?x_44 ?x_45 | |
| [class_instances] (14) ?x_45 : linear_ordered_field G := real.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (14) ?x_45 : linear_ordered_field G := rat.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (14) ?x_45 : linear_ordered_field G := @discrete_linear_ordered_field.to_linear_ordered_field ?x_46 ?x_47 | |
| [class_instances] (15) ?x_47 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (15) ?x_47 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (13) ?x_43 : field G := @discrete_field.to_field ?x_44 ?x_45 | |
| [class_instances] (14) ?x_45 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (14) ?x_45 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (14) ?x_45 : discrete_field G := @local_ring.residue_field.discrete_field ?x_46 ?x_47 | |
| failed is_def_eq | |
| [class_instances] (14) ?x_45 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (14) ?x_45 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_48 ?x_49 | |
| [class_instances] (15) ?x_49 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (15) ?x_49 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (11) ?x_39 : domain G := @linear_nonneg_ring.to_domain ?x_40 ?x_41 | |
| [class_instances] (11) ?x_39 : domain G := @linear_ordered_ring.to_domain ?x_40 ?x_41 | |
| [class_instances] (12) ?x_41 : linear_ordered_ring G := real.linear_ordered_ring | |
| failed is_def_eq | |
| [class_instances] (12) ?x_41 : linear_ordered_ring G := rat.linear_ordered_ring | |
| failed is_def_eq | |
| [class_instances] (12) ?x_41 : linear_ordered_ring G := @linear_ordered_field.to_linear_ordered_ring ?x_42 ?x_43 | |
| [class_instances] (13) ?x_43 : linear_ordered_field G := real.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (13) ?x_43 : linear_ordered_field G := rat.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (13) ?x_43 : linear_ordered_field G := @discrete_linear_ordered_field.to_linear_ordered_field ?x_44 ?x_45 | |
| [class_instances] (14) ?x_45 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (14) ?x_45 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (12) ?x_41 : linear_ordered_ring G := @linear_nonneg_ring.to_linear_ordered_ring ?x_42 ?x_43 | |
| [class_instances] (12) ?x_41 : linear_ordered_ring G := @linear_ordered_comm_ring.to_linear_ordered_ring ?x_42 ?x_43 | |
| [class_instances] (13) ?x_43 : linear_ordered_comm_ring G := real.linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (13) ?x_43 : linear_ordered_comm_ring G := rat.linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (13) ?x_43 : linear_ordered_comm_ring G := @decidable_linear_ordered_comm_ring.to_linear_ordered_comm_ring ?x_44 ?x_45 | |
| [class_instances] (14) ?x_45 : decidable_linear_ordered_comm_ring G := real.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (14) ?x_45 : decidable_linear_ordered_comm_ring G := rat.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (14) ?x_45 : decidable_linear_ordered_comm_ring G := int.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (14) ?x_45 : decidable_linear_ordered_comm_ring G := @discrete_linear_ordered_field.to_decidable_linear_ordered_comm_ring ?x_46 ?x_47 | |
| [class_instances] (15) ?x_47 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (15) ?x_47 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (14) ?x_45 : decidable_linear_ordered_comm_ring G := @linear_nonneg_ring.to_decidable_linear_ordered_comm_ring ?x_46 ?x_47 ?x_48 ?x_49 | |
| [class_instances] (11) ?x_39 : domain G := @integral_domain.to_domain ?x_40 ?x_41 | |
| [class_instances] (12) ?x_41 : integral_domain G := real.integral_domain | |
| failed is_def_eq | |
| [class_instances] (12) ?x_41 : integral_domain G := @polynomial.integral_domain ?x_42 ?x_43 | |
| failed is_def_eq | |
| [class_instances] (12) ?x_41 : integral_domain G := @ideal.quotient.integral_domain ?x_44 ?x_45 ?x_46 ?x_47 | |
| failed is_def_eq | |
| [class_instances] (12) ?x_41 : integral_domain G := @subring.domain ?x_48 ?x_49 ?x_50 ?x_51 | |
| failed is_def_eq | |
| [class_instances] (12) ?x_41 : integral_domain G := rat.integral_domain | |
| failed is_def_eq | |
| [class_instances] (12) ?x_41 : integral_domain G := @principal_ideal_domain.to_integral_domain ?x_52 ?x_53 | |
| [class_instances] (13) ?x_53 : principal_ideal_domain G := @euclidean_domain.to_principal_ideal_domain ?x_54 ?x_55 | |
| [class_instances] (14) ?x_55 : euclidean_domain G := @polynomial.euclidean_domain ?x_56 ?x_57 | |
| failed is_def_eq | |
| [class_instances] (14) ?x_55 : euclidean_domain G := int.euclidean_domain | |
| failed is_def_eq | |
| [class_instances] (14) ?x_55 : euclidean_domain G := @discrete_field.to_euclidean_domain ?x_58 ?x_59 | |
| [class_instances] (15) ?x_59 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (15) ?x_59 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (15) ?x_59 : discrete_field G := @local_ring.residue_field.discrete_field ?x_60 ?x_61 | |
| failed is_def_eq | |
| [class_instances] (15) ?x_59 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (15) ?x_59 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_62 ?x_63 | |
| [class_instances] (16) ?x_63 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (16) ?x_63 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (12) ?x_41 : integral_domain G := @euclidean_domain.integral_domain ?x_42 ?x_43 | |
| [class_instances] (13) ?x_43 : euclidean_domain G := @polynomial.euclidean_domain ?x_44 ?x_45 | |
| failed is_def_eq | |
| [class_instances] (13) ?x_43 : euclidean_domain G := int.euclidean_domain | |
| failed is_def_eq | |
| [class_instances] (13) ?x_43 : euclidean_domain G := @discrete_field.to_euclidean_domain ?x_46 ?x_47 | |
| [class_instances] (14) ?x_47 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (14) ?x_47 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (14) ?x_47 : discrete_field G := @local_ring.residue_field.discrete_field ?x_48 ?x_49 | |
| failed is_def_eq | |
| [class_instances] (14) ?x_47 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (14) ?x_47 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_50 ?x_51 | |
| [class_instances] (15) ?x_51 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (15) ?x_51 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (12) ?x_41 : integral_domain G := @normalization_domain.to_integral_domain ?x_42 ?x_43 | |
| [class_instances] (13) ?x_43 : normalization_domain G := @polynomial.normalization_domain ?x_44 ?x_45 | |
| failed is_def_eq | |
| [class_instances] (13) ?x_43 : normalization_domain G := int.normalization_domain | |
| failed is_def_eq | |
| [class_instances] (13) ?x_43 : normalization_domain G := @gcd_domain.to_normalization_domain ?x_46 ?x_47 | |
| [class_instances] (14) ?x_47 : gcd_domain G := int.gcd_domain | |
| failed is_def_eq | |
| [class_instances] (12) ?x_41 : integral_domain G := @field.to_integral_domain ?x_42 ?x_43 | |
| [class_instances] (13) ?x_43 : field G := real.field | |
| failed is_def_eq | |
| [class_instances] (13) ?x_43 : field G := rat.field | |
| failed is_def_eq | |
| [class_instances] (13) ?x_43 : field G := @linear_ordered_field.to_field ?x_44 ?x_45 | |
| [class_instances] (14) ?x_45 : linear_ordered_field G := real.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (14) ?x_45 : linear_ordered_field G := rat.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (14) ?x_45 : linear_ordered_field G := @discrete_linear_ordered_field.to_linear_ordered_field ?x_46 ?x_47 | |
| [class_instances] (15) ?x_47 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (15) ?x_47 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (13) ?x_43 : field G := @discrete_field.to_field ?x_44 ?x_45 | |
| [class_instances] (14) ?x_45 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (14) ?x_45 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (14) ?x_45 : discrete_field G := @local_ring.residue_field.discrete_field ?x_46 ?x_47 | |
| failed is_def_eq | |
| [class_instances] (14) ?x_45 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (14) ?x_45 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_48 ?x_49 | |
| [class_instances] (15) ?x_49 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (15) ?x_49 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (12) ?x_41 : integral_domain G := @discrete_field.to_integral_domain ?x_42 ?x_43 ?x_44 | |
| [class_instances] (13) ?x_43 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (13) ?x_43 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (13) ?x_43 : discrete_field G := @local_ring.residue_field.discrete_field ?x_45 ?x_46 | |
| failed is_def_eq | |
| [class_instances] (13) ?x_43 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (13) ?x_43 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_47 ?x_48 | |
| [class_instances] (14) ?x_48 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (14) ?x_48 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (12) ?x_41 : integral_domain G := @linear_ordered_comm_ring.to_integral_domain ?x_42 ?x_43 | |
| [class_instances] (13) ?x_43 : linear_ordered_comm_ring G := real.linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (13) ?x_43 : linear_ordered_comm_ring G := rat.linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (13) ?x_43 : linear_ordered_comm_ring G := @decidable_linear_ordered_comm_ring.to_linear_ordered_comm_ring ?x_44 ?x_45 | |
| [class_instances] (14) ?x_45 : decidable_linear_ordered_comm_ring G := real.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (14) ?x_45 : decidable_linear_ordered_comm_ring G := rat.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (14) ?x_45 : decidable_linear_ordered_comm_ring G := int.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (14) ?x_45 : decidable_linear_ordered_comm_ring G := @discrete_linear_ordered_field.to_decidable_linear_ordered_comm_ring ?x_46 ?x_47 | |
| [class_instances] (15) ?x_47 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (15) ?x_47 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (14) ?x_45 : decidable_linear_ordered_comm_ring G := @linear_nonneg_ring.to_decidable_linear_ordered_comm_ring ?x_46 ?x_47 ?x_48 ?x_49 | |
| [class_instances] (9) ?x_34 : ring G := @ @reduced.to_ring ?x_36 ?x_37 | |
| [class_instances] (9) ?x_34 : ring G := @dedekind_finite.to_ring ?x_36 ?x_37 | |
| [class_instances] (10) ?x_37 : dedekind_finite G := @pi.dedekind_finite ?x_38 ?x_39 ?x_40 | |
| failed is_def_eq | |
| [class_instances] (10) ?x_37 : dedekind_finite G := @ @_root_.dedekind_finite_of_noetherian ?x_41 ?x_42 ?x_43 | |
| [class_instances] (11) ?x_42 : ring G := @ @reversible.to_ring ?x_44 ?x_45 | |
| [class_instances] (12) ?x_45 : _root_.reversible G := @ @_root_.reversible_of_comm_ring ?x_46 ?x_47 | |
| [class_instances] (13) ?x_47 : comm_ring G := @subalgebra.comm_ring ?x_48 ?x_49 ?x_50 ?x_51 ?x_52 ?x_53 | |
| failed is_def_eq | |
| [class_instances] (13) ?x_47 : comm_ring G := @algebra.comap.comm_ring ?x_54 ?x_55 ?x_56 ?x_57 ?x_58 ?x_59 ?x_60 ?x_61 | |
| failed is_def_eq | |
| [class_instances] (13) ?x_47 : comm_ring G := complex.comm_ring | |
| failed is_def_eq | |
| [class_instances] (13) ?x_47 : comm_ring G := real.comm_ring | |
| failed is_def_eq | |
| [class_instances] (13) ?x_47 : comm_ring G := @cau_seq.completion.comm_ring ?x_62 ?x_63 ?x_64 ?x_65 ?x_66 ?x_67 | |
| failed is_def_eq | |
| [class_instances] (13) ?x_47 : comm_ring G := @cau_seq.comm_ring ?x_68 ?x_69 ?x_70 ?x_71 ?x_72 ?x_73 | |
| failed is_def_eq | |
| [class_instances] (13) ?x_47 : comm_ring G := @mv_polynomial.comm_ring ?x_74 ?x_75 ?x_76 | |
| failed is_def_eq | |
| [class_instances] (13) ?x_47 : comm_ring G := @polynomial.comm_ring ?x_77 ?x_78 | |
| failed is_def_eq | |
| [class_instances] (13) ?x_47 : comm_ring G := @free_abelian_group.comm_ring ?x_79 ?x_80 | |
| failed is_def_eq | |
| [class_instances] (13) ?x_47 : comm_ring G := @ideal.quotient.comm_ring ?x_81 ?x_82 ?x_83 | |
| failed is_def_eq | |
| [class_instances] (13) ?x_47 : comm_ring G := @finsupp.comm_ring ?x_84 ?x_85 ?x_86 ?x_87 | |
| failed is_def_eq | |
| [class_instances] (13) ?x_47 : comm_ring G := @prod.comm_ring ?x_88 ?x_89 ?x_90 ?x_91 | |
| failed is_def_eq | |
| [class_instances] (13) ?x_47 : comm_ring G := @pi.comm_ring ?x_92 ?x_93 ?x_94 | |
| failed is_def_eq | |
| [class_instances] (13) ?x_47 : comm_ring G := @subtype.comm_ring ?x_95 ?x_96 ?x_97 ?x_98 | |
| failed is_def_eq | |
| [class_instances] (13) ?x_47 : comm_ring G := @subset.comm_ring ?x_99 ?x_100 ?x_101 ?x_102 | |
| failed is_def_eq | |
| [class_instances] (13) ?x_47 : comm_ring G := rat.comm_ring | |
| failed is_def_eq | |
| [class_instances] (13) ?x_47 : comm_ring G := int.comm_ring | |
| failed is_def_eq | |
| [class_instances] (13) ?x_47 : comm_ring G := @nonzero_comm_ring.to_comm_ring ?x_103 ?x_104 | |
| [class_instances] (14) ?x_104 : nonzero_comm_ring G := real.nonzero_comm_ring | |
| failed is_def_eq | |
| [class_instances] (14) ?x_104 : nonzero_comm_ring G := @polynomial.nonzero_comm_ring ?x_105 ?x_106 | |
| failed is_def_eq | |
| [class_instances] (14) ?x_104 : nonzero_comm_ring G := @prod.nonzero_comm_ring ?x_107 ?x_108 ?x_109 ?x_110 | |
| failed is_def_eq | |
| [class_instances] (14) ?x_104 : nonzero_comm_ring G := rat.nonzero_comm_ring | |
| failed is_def_eq | |
| [class_instances] (14) ?x_104 : nonzero_comm_ring G := @euclidean_domain.to_nonzero_comm_ring ?x_111 ?x_112 | |
| [class_instances] (15) ?x_112 : euclidean_domain G := @polynomial.euclidean_domain ?x_113 ?x_114 | |
| failed is_def_eq | |
| [class_instances] (15) ?x_112 : euclidean_domain G := int.euclidean_domain | |
| failed is_def_eq | |
| [class_instances] (15) ?x_112 : euclidean_domain G := @discrete_field.to_euclidean_domain ?x_115 ?x_116 | |
| [class_instances] (16) ?x_116 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (16) ?x_116 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (16) ?x_116 : discrete_field G := @local_ring.residue_field.discrete_field ?x_117 ?x_118 | |
| failed is_def_eq | |
| [class_instances] (16) ?x_116 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (16) ?x_116 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_119 ?x_120 | |
| [class_instances] (17) ?x_120 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (17) ?x_120 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (14) ?x_104 : nonzero_comm_ring G := @local_ring.to_nonzero_comm_ring ?x_105 ?x_106 | |
| [class_instances] (15) ?x_106 : local_ring G := @discrete_field.local_ring ?x_107 ?x_108 | |
| [class_instances] (16) ?x_108 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (16) ?x_108 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (16) ?x_108 : discrete_field G := @local_ring.residue_field.discrete_field ?x_109 ?x_110 | |
| failed is_def_eq | |
| [class_instances] (16) ?x_108 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (16) ?x_108 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_111 ?x_112 | |
| [class_instances] (17) ?x_112 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (17) ?x_112 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (14) ?x_104 : nonzero_comm_ring G := @integral_domain.to_nonzero_comm_ring ?x_105 ?x_106 | |
| [class_instances] (15) ?x_106 : integral_domain G := real.integral_domain | |
| failed is_def_eq | |
| [class_instances] (15) ?x_106 : integral_domain G := @polynomial.integral_domain ?x_107 ?x_108 | |
| failed is_def_eq | |
| [class_instances] (15) ?x_106 : integral_domain G := @ideal.quotient.integral_domain ?x_109 ?x_110 ?x_111 ?x_112 | |
| failed is_def_eq | |
| [class_instances] (15) ?x_106 : integral_domain G := @subring.domain ?x_113 ?x_114 ?x_115 ?x_116 | |
| failed is_def_eq | |
| [class_instances] (15) ?x_106 : integral_domain G := rat.integral_domain | |
| failed is_def_eq | |
| [class_instances] (15) ?x_106 : integral_domain G := @principal_ideal_domain.to_integral_domain ?x_117 ?x_118 | |
| [class_instances] (16) ?x_118 : principal_ideal_domain G := @euclidean_domain.to_principal_ideal_domain ?x_119 ?x_120 | |
| [class_instances] (17) ?x_120 : euclidean_domain G := @polynomial.euclidean_domain ?x_121 ?x_122 | |
| failed is_def_eq | |
| [class_instances] (17) ?x_120 : euclidean_domain G := int.euclidean_domain | |
| failed is_def_eq | |
| [class_instances] (17) ?x_120 : euclidean_domain G := @discrete_field.to_euclidean_domain ?x_123 ?x_124 | |
| [class_instances] (18) ?x_124 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (18) ?x_124 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (18) ?x_124 : discrete_field G := @local_ring.residue_field.discrete_field ?x_125 ?x_126 | |
| failed is_def_eq | |
| [class_instances] (18) ?x_124 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (18) ?x_124 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_127 ?x_128 | |
| [class_instances] (19) ?x_128 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (19) ?x_128 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (15) ?x_106 : integral_domain G := @euclidean_domain.integral_domain ?x_107 ?x_108 | |
| [class_instances] (16) ?x_108 : euclidean_domain G := @polynomial.euclidean_domain ?x_109 ?x_110 | |
| failed is_def_eq | |
| [class_instances] (16) ?x_108 : euclidean_domain G := int.euclidean_domain | |
| failed is_def_eq | |
| [class_instances] (16) ?x_108 : euclidean_domain G := @discrete_field.to_euclidean_domain ?x_111 ?x_112 | |
| [class_instances] (17) ?x_112 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (17) ?x_112 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (17) ?x_112 : discrete_field G := @local_ring.residue_field.discrete_field ?x_113 ?x_114 | |
| failed is_def_eq | |
| [class_instances] (17) ?x_112 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (17) ?x_112 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_115 ?x_116 | |
| [class_instances] (18) ?x_116 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (18) ?x_116 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (15) ?x_106 : integral_domain G := @normalization_domain.to_integral_domain ?x_107 ?x_108 | |
| [class_instances] (16) ?x_108 : normalization_domain G := @polynomial.normalization_domain ?x_109 ?x_110 | |
| failed is_def_eq | |
| [class_instances] (16) ?x_108 : normalization_domain G := int.normalization_domain | |
| failed is_def_eq | |
| [class_instances] (16) ?x_108 : normalization_domain G := @gcd_domain.to_normalization_domain ?x_111 ?x_112 | |
| [class_instances] (17) ?x_112 : gcd_domain G := int.gcd_domain | |
| failed is_def_eq | |
| [class_instances] (15) ?x_106 : integral_domain G := @field.to_integral_domain ?x_107 ?x_108 | |
| [class_instances] (16) ?x_108 : field G := real.field | |
| failed is_def_eq | |
| [class_instances] (16) ?x_108 : field G := rat.field | |
| failed is_def_eq | |
| [class_instances] (16) ?x_108 : field G := @linear_ordered_field.to_field ?x_109 ?x_110 | |
| [class_instances] (17) ?x_110 : linear_ordered_field G := real.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (17) ?x_110 : linear_ordered_field G := rat.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (17) ?x_110 : linear_ordered_field G := @discrete_linear_ordered_field.to_linear_ordered_field ?x_111 ?x_112 | |
| [class_instances] (18) ?x_112 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (18) ?x_112 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (16) ?x_108 : field G := @discrete_field.to_field ?x_109 ?x_110 | |
| [class_instances] (17) ?x_110 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (17) ?x_110 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (17) ?x_110 : discrete_field G := @local_ring.residue_field.discrete_field ?x_111 ?x_112 | |
| failed is_def_eq | |
| [class_instances] (17) ?x_110 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (17) ?x_110 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_113 ?x_114 | |
| [class_instances] (18) ?x_114 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (18) ?x_114 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (15) ?x_106 : integral_domain G := @discrete_field.to_integral_domain ?x_107 ?x_108 ?x_109 | |
| [class_instances] (16) ?x_108 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (16) ?x_108 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (16) ?x_108 : discrete_field G := @local_ring.residue_field.discrete_field ?x_110 ?x_111 | |
| failed is_def_eq | |
| [class_instances] (16) ?x_108 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (16) ?x_108 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_112 ?x_113 | |
| [class_instances] (17) ?x_113 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (17) ?x_113 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (15) ?x_106 : integral_domain G := @linear_ordered_comm_ring.to_integral_domain ?x_107 ?x_108 | |
| [class_instances] (16) ?x_108 : linear_ordered_comm_ring G := real.linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (16) ?x_108 : linear_ordered_comm_ring G := rat.linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (16) ?x_108 : linear_ordered_comm_ring G := @decidable_linear_ordered_comm_ring.to_linear_ordered_comm_ring ?x_109 ?x_110 | |
| [class_instances] (17) ?x_110 : decidable_linear_ordered_comm_ring G := real.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (17) ?x_110 : decidable_linear_ordered_comm_ring G := rat.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (17) ?x_110 : decidable_linear_ordered_comm_ring G := int.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (17) ?x_110 : decidable_linear_ordered_comm_ring G := @discrete_linear_ordered_field.to_decidable_linear_ordered_comm_ring ?x_111 ?x_112 | |
| [class_instances] (18) ?x_112 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (18) ?x_112 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (17) ?x_110 : decidable_linear_ordered_comm_ring G := @linear_nonneg_ring.to_decidable_linear_ordered_comm_ring ?x_111 ?x_112 ?x_113 ?x_114 | |
| [class_instances] (13) ?x_47 : comm_ring G := @field.to_comm_ring ?x_48 ?x_49 | |
| [class_instances] (14) ?x_49 : field G := real.field | |
| failed is_def_eq | |
| [class_instances] (14) ?x_49 : field G := rat.field | |
| failed is_def_eq | |
| [class_instances] (14) ?x_49 : field G := @linear_ordered_field.to_field ?x_50 ?x_51 | |
| [class_instances] (15) ?x_51 : linear_ordered_field G := real.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (15) ?x_51 : linear_ordered_field G := rat.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (15) ?x_51 : linear_ordered_field G := @discrete_linear_ordered_field.to_linear_ordered_field ?x_52 ?x_53 | |
| [class_instances] (16) ?x_53 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (16) ?x_53 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (14) ?x_49 : field G := @discrete_field.to_field ?x_50 ?x_51 | |
| [class_instances] (15) ?x_51 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (15) ?x_51 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (15) ?x_51 : discrete_field G := @local_ring.residue_field.discrete_field ?x_52 ?x_53 | |
| failed is_def_eq | |
| [class_instances] (15) ?x_51 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (15) ?x_51 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_54 ?x_55 | |
| [class_instances] (16) ?x_55 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (16) ?x_55 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (13) ?x_47 : comm_ring G := @integral_domain.to_comm_ring ?x_48 ?x_49 | |
| [class_instances] (14) ?x_49 : integral_domain G := real.integral_domain | |
| failed is_def_eq | |
| [class_instances] (14) ?x_49 : integral_domain G := @polynomial.integral_domain ?x_50 ?x_51 | |
| failed is_def_eq | |
| [class_instances] (14) ?x_49 : integral_domain G := @ideal.quotient.integral_domain ?x_52 ?x_53 ?x_54 ?x_55 | |
| failed is_def_eq | |
| [class_instances] (14) ?x_49 : integral_domain G := @subring.domain ?x_56 ?x_57 ?x_58 ?x_59 | |
| failed is_def_eq | |
| [class_instances] (14) ?x_49 : integral_domain G := rat.integral_domain | |
| failed is_def_eq | |
| [class_instances] (14) ?x_49 : integral_domain G := @principal_ideal_domain.to_integral_domain ?x_60 ?x_61 | |
| [class_instances] (15) ?x_61 : principal_ideal_domain G := @euclidean_domain.to_principal_ideal_domain ?x_62 ?x_63 | |
| [class_instances] (16) ?x_63 : euclidean_domain G := @polynomial.euclidean_domain ?x_64 ?x_65 | |
| failed is_def_eq | |
| [class_instances] (16) ?x_63 : euclidean_domain G := int.euclidean_domain | |
| failed is_def_eq | |
| [class_instances] (16) ?x_63 : euclidean_domain G := @discrete_field.to_euclidean_domain ?x_66 ?x_67 | |
| [class_instances] (17) ?x_67 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (17) ?x_67 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (17) ?x_67 : discrete_field G := @local_ring.residue_field.discrete_field ?x_68 ?x_69 | |
| failed is_def_eq | |
| [class_instances] (17) ?x_67 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (17) ?x_67 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_70 ?x_71 | |
| [class_instances] (18) ?x_71 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (18) ?x_71 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (14) ?x_49 : integral_domain G := @euclidean_domain.integral_domain ?x_50 ?x_51 | |
| [class_instances] (15) ?x_51 : euclidean_domain G := @polynomial.euclidean_domain ?x_52 ?x_53 | |
| failed is_def_eq | |
| [class_instances] (15) ?x_51 : euclidean_domain G := int.euclidean_domain | |
| failed is_def_eq | |
| [class_instances] (15) ?x_51 : euclidean_domain G := @discrete_field.to_euclidean_domain ?x_54 ?x_55 | |
| [class_instances] (16) ?x_55 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (16) ?x_55 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (16) ?x_55 : discrete_field G := @local_ring.residue_field.discrete_field ?x_56 ?x_57 | |
| failed is_def_eq | |
| [class_instances] (16) ?x_55 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (16) ?x_55 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_58 ?x_59 | |
| [class_instances] (17) ?x_59 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (17) ?x_59 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (14) ?x_49 : integral_domain G := @normalization_domain.to_integral_domain ?x_50 ?x_51 | |
| [class_instances] (15) ?x_51 : normalization_domain G := @polynomial.normalization_domain ?x_52 ?x_53 | |
| failed is_def_eq | |
| [class_instances] (15) ?x_51 : normalization_domain G := int.normalization_domain | |
| failed is_def_eq | |
| [class_instances] (15) ?x_51 : normalization_domain G := @gcd_domain.to_normalization_domain ?x_54 ?x_55 | |
| [class_instances] (16) ?x_55 : gcd_domain G := int.gcd_domain | |
| failed is_def_eq | |
| [class_instances] (14) ?x_49 : integral_domain G := @field.to_integral_domain ?x_50 ?x_51 | |
| [class_instances] (15) ?x_51 : field G := real.field | |
| failed is_def_eq | |
| [class_instances] (15) ?x_51 : field G := rat.field | |
| failed is_def_eq | |
| [class_instances] (15) ?x_51 : field G := @linear_ordered_field.to_field ?x_52 ?x_53 | |
| [class_instances] (16) ?x_53 : linear_ordered_field G := real.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (16) ?x_53 : linear_ordered_field G := rat.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (16) ?x_53 : linear_ordered_field G := @discrete_linear_ordered_field.to_linear_ordered_field ?x_54 ?x_55 | |
| [class_instances] (17) ?x_55 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (17) ?x_55 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (15) ?x_51 : field G := @discrete_field.to_field ?x_52 ?x_53 | |
| [class_instances] (16) ?x_53 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (16) ?x_53 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (16) ?x_53 : discrete_field G := @local_ring.residue_field.discrete_field ?x_54 ?x_55 | |
| failed is_def_eq | |
| [class_instances] (16) ?x_53 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (16) ?x_53 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_56 ?x_57 | |
| [class_instances] (17) ?x_57 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (17) ?x_57 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (14) ?x_49 : integral_domain G := @discrete_field.to_integral_domain ?x_50 ?x_51 ?x_52 | |
| [class_instances] (15) ?x_51 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (15) ?x_51 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (15) ?x_51 : discrete_field G := @local_ring.residue_field.discrete_field ?x_53 ?x_54 | |
| failed is_def_eq | |
| [class_instances] (15) ?x_51 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (15) ?x_51 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_55 ?x_56 | |
| [class_instances] (16) ?x_56 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (16) ?x_56 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (14) ?x_49 : integral_domain G := @linear_ordered_comm_ring.to_integral_domain ?x_50 ?x_51 | |
| [class_instances] (15) ?x_51 : linear_ordered_comm_ring G := real.linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (15) ?x_51 : linear_ordered_comm_ring G := rat.linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (15) ?x_51 : linear_ordered_comm_ring G := @decidable_linear_ordered_comm_ring.to_linear_ordered_comm_ring ?x_52 ?x_53 | |
| [class_instances] (16) ?x_53 : decidable_linear_ordered_comm_ring G := real.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (16) ?x_53 : decidable_linear_ordered_comm_ring G := rat.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (16) ?x_53 : decidable_linear_ordered_comm_ring G := int.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (16) ?x_53 : decidable_linear_ordered_comm_ring G := @discrete_linear_ordered_field.to_decidable_linear_ordered_comm_ring ?x_54 ?x_55 | |
| [class_instances] (17) ?x_55 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (17) ?x_55 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (16) ?x_53 : decidable_linear_ordered_comm_ring G := @linear_nonneg_ring.to_decidable_linear_ordered_comm_ring ?x_54 ?x_55 ?x_56 ?x_57 | |
| [class_instances] (12) ?x_45 : _root_.reversible G := @ @_root_.reversible_of_reduced ?x_46 ?x_47 | |
| [class_instances] (12) ?x_45 : _root_.reversible G := @ @_root_.reversible_of_domain ?x_46 ?x_47 | |
| [class_instances] (13) ?x_47 : domain G := real.domain | |
| failed is_def_eq | |
| [class_instances] (13) ?x_47 : domain G := @division_ring.to_domain ?x_48 ?x_49 | |
| [class_instances] (14) ?x_49 : division_ring G := real.division_ring | |
| failed is_def_eq | |
| [class_instances] (14) ?x_49 : division_ring G := rat.division_ring | |
| failed is_def_eq | |
| [class_instances] (14) ?x_49 : division_ring G := @field.to_division_ring ?x_50 ?x_51 | |
| [class_instances] (15) ?x_51 : field G := real.field | |
| failed is_def_eq | |
| [class_instances] (15) ?x_51 : field G := rat.field | |
| failed is_def_eq | |
| [class_instances] (15) ?x_51 : field G := @linear_ordered_field.to_field ?x_52 ?x_53 | |
| [class_instances] (16) ?x_53 : linear_ordered_field G := real.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (16) ?x_53 : linear_ordered_field G := rat.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (16) ?x_53 : linear_ordered_field G := @discrete_linear_ordered_field.to_linear_ordered_field ?x_54 ?x_55 | |
| [class_instances] (17) ?x_55 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (17) ?x_55 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (15) ?x_51 : field G := @discrete_field.to_field ?x_52 ?x_53 | |
| [class_instances] (16) ?x_53 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (16) ?x_53 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (16) ?x_53 : discrete_field G := @local_ring.residue_field.discrete_field ?x_54 ?x_55 | |
| failed is_def_eq | |
| [class_instances] (16) ?x_53 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (16) ?x_53 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_56 ?x_57 | |
| [class_instances] (17) ?x_57 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (17) ?x_57 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (13) ?x_47 : domain G := @linear_nonneg_ring.to_domain ?x_48 ?x_49 | |
| [class_instances] (13) ?x_47 : domain G := @linear_ordered_ring.to_domain ?x_48 ?x_49 | |
| [class_instances] (14) ?x_49 : linear_ordered_ring G := real.linear_ordered_ring | |
| failed is_def_eq | |
| [class_instances] (14) ?x_49 : linear_ordered_ring G := rat.linear_ordered_ring | |
| failed is_def_eq | |
| [class_instances] (14) ?x_49 : linear_ordered_ring G := @linear_ordered_field.to_linear_ordered_ring ?x_50 ?x_51 | |
| [class_instances] (15) ?x_51 : linear_ordered_field G := real.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (15) ?x_51 : linear_ordered_field G := rat.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (15) ?x_51 : linear_ordered_field G := @discrete_linear_ordered_field.to_linear_ordered_field ?x_52 ?x_53 | |
| [class_instances] (16) ?x_53 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (16) ?x_53 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (14) ?x_49 : linear_ordered_ring G := @linear_nonneg_ring.to_linear_ordered_ring ?x_50 ?x_51 | |
| [class_instances] (14) ?x_49 : linear_ordered_ring G := @linear_ordered_comm_ring.to_linear_ordered_ring ?x_50 ?x_51 | |
| [class_instances] (15) ?x_51 : linear_ordered_comm_ring G := real.linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (15) ?x_51 : linear_ordered_comm_ring G := rat.linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (15) ?x_51 : linear_ordered_comm_ring G := @decidable_linear_ordered_comm_ring.to_linear_ordered_comm_ring ?x_52 ?x_53 | |
| [class_instances] (16) ?x_53 : decidable_linear_ordered_comm_ring G := real.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (16) ?x_53 : decidable_linear_ordered_comm_ring G := rat.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (16) ?x_53 : decidable_linear_ordered_comm_ring G := int.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (16) ?x_53 : decidable_linear_ordered_comm_ring G := @discrete_linear_ordered_field.to_decidable_linear_ordered_comm_ring ?x_54 ?x_55 | |
| [class_instances] (17) ?x_55 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (17) ?x_55 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (16) ?x_53 : decidable_linear_ordered_comm_ring G := @linear_nonneg_ring.to_decidable_linear_ordered_comm_ring ?x_54 ?x_55 ?x_56 ?x_57 | |
| [class_instances] (13) ?x_47 : domain G := @integral_domain.to_domain ?x_48 ?x_49 | |
| [class_instances] (14) ?x_49 : integral_domain G := real.integral_domain | |
| failed is_def_eq | |
| [class_instances] (14) ?x_49 : integral_domain G := @polynomial.integral_domain ?x_50 ?x_51 | |
| failed is_def_eq | |
| [class_instances] (14) ?x_49 : integral_domain G := @ideal.quotient.integral_domain ?x_52 ?x_53 ?x_54 ?x_55 | |
| failed is_def_eq | |
| [class_instances] (14) ?x_49 : integral_domain G := @subring.domain ?x_56 ?x_57 ?x_58 ?x_59 | |
| failed is_def_eq | |
| [class_instances] (14) ?x_49 : integral_domain G := rat.integral_domain | |
| failed is_def_eq | |
| [class_instances] (14) ?x_49 : integral_domain G := @principal_ideal_domain.to_integral_domain ?x_60 ?x_61 | |
| [class_instances] (15) ?x_61 : principal_ideal_domain G := @euclidean_domain.to_principal_ideal_domain ?x_62 ?x_63 | |
| [class_instances] (16) ?x_63 : euclidean_domain G := @polynomial.euclidean_domain ?x_64 ?x_65 | |
| failed is_def_eq | |
| [class_instances] (16) ?x_63 : euclidean_domain G := int.euclidean_domain | |
| failed is_def_eq | |
| [class_instances] (16) ?x_63 : euclidean_domain G := @discrete_field.to_euclidean_domain ?x_66 ?x_67 | |
| [class_instances] (17) ?x_67 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (17) ?x_67 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (17) ?x_67 : discrete_field G := @local_ring.residue_field.discrete_field ?x_68 ?x_69 | |
| failed is_def_eq | |
| [class_instances] (17) ?x_67 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (17) ?x_67 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_70 ?x_71 | |
| [class_instances] (18) ?x_71 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (18) ?x_71 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (14) ?x_49 : integral_domain G := @euclidean_domain.integral_domain ?x_50 ?x_51 | |
| [class_instances] (15) ?x_51 : euclidean_domain G := @polynomial.euclidean_domain ?x_52 ?x_53 | |
| failed is_def_eq | |
| [class_instances] (15) ?x_51 : euclidean_domain G := int.euclidean_domain | |
| failed is_def_eq | |
| [class_instances] (15) ?x_51 : euclidean_domain G := @discrete_field.to_euclidean_domain ?x_54 ?x_55 | |
| [class_instances] (16) ?x_55 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (16) ?x_55 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (16) ?x_55 : discrete_field G := @local_ring.residue_field.discrete_field ?x_56 ?x_57 | |
| failed is_def_eq | |
| [class_instances] (16) ?x_55 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (16) ?x_55 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_58 ?x_59 | |
| [class_instances] (17) ?x_59 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (17) ?x_59 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (14) ?x_49 : integral_domain G := @normalization_domain.to_integral_domain ?x_50 ?x_51 | |
| [class_instances] (15) ?x_51 : normalization_domain G := @polynomial.normalization_domain ?x_52 ?x_53 | |
| failed is_def_eq | |
| [class_instances] (15) ?x_51 : normalization_domain G := int.normalization_domain | |
| failed is_def_eq | |
| [class_instances] (15) ?x_51 : normalization_domain G := @gcd_domain.to_normalization_domain ?x_54 ?x_55 | |
| [class_instances] (16) ?x_55 : gcd_domain G := int.gcd_domain | |
| failed is_def_eq | |
| [class_instances] (14) ?x_49 : integral_domain G := @field.to_integral_domain ?x_50 ?x_51 | |
| [class_instances] (15) ?x_51 : field G := real.field | |
| failed is_def_eq | |
| [class_instances] (15) ?x_51 : field G := rat.field | |
| failed is_def_eq | |
| [class_instances] (15) ?x_51 : field G := @linear_ordered_field.to_field ?x_52 ?x_53 | |
| [class_instances] (16) ?x_53 : linear_ordered_field G := real.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (16) ?x_53 : linear_ordered_field G := rat.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (16) ?x_53 : linear_ordered_field G := @discrete_linear_ordered_field.to_linear_ordered_field ?x_54 ?x_55 | |
| [class_instances] (17) ?x_55 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (17) ?x_55 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (15) ?x_51 : field G := @discrete_field.to_field ?x_52 ?x_53 | |
| [class_instances] (16) ?x_53 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (16) ?x_53 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (16) ?x_53 : discrete_field G := @local_ring.residue_field.discrete_field ?x_54 ?x_55 | |
| failed is_def_eq | |
| [class_instances] (16) ?x_53 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (16) ?x_53 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_56 ?x_57 | |
| [class_instances] (17) ?x_57 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (17) ?x_57 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (14) ?x_49 : integral_domain G := @discrete_field.to_integral_domain ?x_50 ?x_51 ?x_52 | |
| [class_instances] (15) ?x_51 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (15) ?x_51 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (15) ?x_51 : discrete_field G := @local_ring.residue_field.discrete_field ?x_53 ?x_54 | |
| failed is_def_eq | |
| [class_instances] (15) ?x_51 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (15) ?x_51 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_55 ?x_56 | |
| [class_instances] (16) ?x_56 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (16) ?x_56 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (14) ?x_49 : integral_domain G := @linear_ordered_comm_ring.to_integral_domain ?x_50 ?x_51 | |
| [class_instances] (15) ?x_51 : linear_ordered_comm_ring G := real.linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (15) ?x_51 : linear_ordered_comm_ring G := rat.linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (15) ?x_51 : linear_ordered_comm_ring G := @decidable_linear_ordered_comm_ring.to_linear_ordered_comm_ring ?x_52 ?x_53 | |
| [class_instances] (16) ?x_53 : decidable_linear_ordered_comm_ring G := real.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (16) ?x_53 : decidable_linear_ordered_comm_ring G := rat.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (16) ?x_53 : decidable_linear_ordered_comm_ring G := int.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (16) ?x_53 : decidable_linear_ordered_comm_ring G := @discrete_linear_ordered_field.to_decidable_linear_ordered_comm_ring ?x_54 ?x_55 | |
| [class_instances] (17) ?x_55 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (17) ?x_55 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (16) ?x_53 : decidable_linear_ordered_comm_ring G := @linear_nonneg_ring.to_decidable_linear_ordered_comm_ring ?x_54 ?x_55 ?x_56 ?x_57 | |
| [class_instances] (11) ?x_42 : ring G := @ @reduced.to_ring ?x_44 ?x_45 | |
| [class_instances] (11) ?x_42 : ring G := @dedekind_finite.to_ring ?x_44 ?x_45 | |
| [class_instances] (12) ?x_45 : dedekind_finite G := @pi.dedekind_finite ?x_46 ?x_47 ?x_48 | |
| failed is_def_eq | |
| [class_instances] (12) ?x_45 : dedekind_finite G := @ @_root_.dedekind_finite_of_noetherian ?x_49 ?x_50 ?x_51 | |
| [class_instances] (13) ?x_50 : ring G := @ @reversible.to_ring ?x_52 ?x_53 | |
| [class_instances] (14) ?x_53 : _root_.reversible G := @ @_root_.reversible_of_comm_ring ?x_54 ?x_55 | |
| [class_instances] (15) ?x_55 : comm_ring G := @subalgebra.comm_ring ?x_56 ?x_57 ?x_58 ?x_59 ?x_60 ?x_61 | |
| failed is_def_eq | |
| [class_instances] (15) ?x_55 : comm_ring G := @algebra.comap.comm_ring ?x_62 ?x_63 ?x_64 ?x_65 ?x_66 ?x_67 ?x_68 ?x_69 | |
| failed is_def_eq | |
| [class_instances] (15) ?x_55 : comm_ring G := complex.comm_ring | |
| failed is_def_eq | |
| [class_instances] (15) ?x_55 : comm_ring G := real.comm_ring | |
| failed is_def_eq | |
| [class_instances] (15) ?x_55 : comm_ring G := @cau_seq.completion.comm_ring ?x_70 ?x_71 ?x_72 ?x_73 ?x_74 ?x_75 | |
| failed is_def_eq | |
| [class_instances] (15) ?x_55 : comm_ring G := @cau_seq.comm_ring ?x_76 ?x_77 ?x_78 ?x_79 ?x_80 ?x_81 | |
| failed is_def_eq | |
| [class_instances] (15) ?x_55 : comm_ring G := @mv_polynomial.comm_ring ?x_82 ?x_83 ?x_84 | |
| failed is_def_eq | |
| [class_instances] (15) ?x_55 : comm_ring G := @polynomial.comm_ring ?x_85 ?x_86 | |
| failed is_def_eq | |
| [class_instances] (15) ?x_55 : comm_ring G := @free_abelian_group.comm_ring ?x_87 ?x_88 | |
| failed is_def_eq | |
| [class_instances] (15) ?x_55 : comm_ring G := @ideal.quotient.comm_ring ?x_89 ?x_90 ?x_91 | |
| failed is_def_eq | |
| [class_instances] (15) ?x_55 : comm_ring G := @finsupp.comm_ring ?x_92 ?x_93 ?x_94 ?x_95 | |
| failed is_def_eq | |
| [class_instances] (15) ?x_55 : comm_ring G := @prod.comm_ring ?x_96 ?x_97 ?x_98 ?x_99 | |
| failed is_def_eq | |
| [class_instances] (15) ?x_55 : comm_ring G := @pi.comm_ring ?x_100 ?x_101 ?x_102 | |
| failed is_def_eq | |
| [class_instances] (15) ?x_55 : comm_ring G := @subtype.comm_ring ?x_103 ?x_104 ?x_105 ?x_106 | |
| failed is_def_eq | |
| [class_instances] (15) ?x_55 : comm_ring G := @subset.comm_ring ?x_107 ?x_108 ?x_109 ?x_110 | |
| failed is_def_eq | |
| [class_instances] (15) ?x_55 : comm_ring G := rat.comm_ring | |
| failed is_def_eq | |
| [class_instances] (15) ?x_55 : comm_ring G := int.comm_ring | |
| failed is_def_eq | |
| [class_instances] (15) ?x_55 : comm_ring G := @nonzero_comm_ring.to_comm_ring ?x_111 ?x_112 | |
| [class_instances] (16) ?x_112 : nonzero_comm_ring G := real.nonzero_comm_ring | |
| failed is_def_eq | |
| [class_instances] (16) ?x_112 : nonzero_comm_ring G := @polynomial.nonzero_comm_ring ?x_113 ?x_114 | |
| failed is_def_eq | |
| [class_instances] (16) ?x_112 : nonzero_comm_ring G := @prod.nonzero_comm_ring ?x_115 ?x_116 ?x_117 ?x_118 | |
| failed is_def_eq | |
| [class_instances] (16) ?x_112 : nonzero_comm_ring G := rat.nonzero_comm_ring | |
| failed is_def_eq | |
| [class_instances] (16) ?x_112 : nonzero_comm_ring G := @euclidean_domain.to_nonzero_comm_ring ?x_119 ?x_120 | |
| [class_instances] (17) ?x_120 : euclidean_domain G := @polynomial.euclidean_domain ?x_121 ?x_122 | |
| failed is_def_eq | |
| [class_instances] (17) ?x_120 : euclidean_domain G := int.euclidean_domain | |
| failed is_def_eq | |
| [class_instances] (17) ?x_120 : euclidean_domain G := @discrete_field.to_euclidean_domain ?x_123 ?x_124 | |
| [class_instances] (18) ?x_124 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (18) ?x_124 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (18) ?x_124 : discrete_field G := @local_ring.residue_field.discrete_field ?x_125 ?x_126 | |
| failed is_def_eq | |
| [class_instances] (18) ?x_124 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (18) ?x_124 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_127 ?x_128 | |
| [class_instances] (19) ?x_128 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (19) ?x_128 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (16) ?x_112 : nonzero_comm_ring G := @local_ring.to_nonzero_comm_ring ?x_113 ?x_114 | |
| [class_instances] (17) ?x_114 : local_ring G := @discrete_field.local_ring ?x_115 ?x_116 | |
| [class_instances] (18) ?x_116 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (18) ?x_116 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (18) ?x_116 : discrete_field G := @local_ring.residue_field.discrete_field ?x_117 ?x_118 | |
| failed is_def_eq | |
| [class_instances] (18) ?x_116 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (18) ?x_116 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_119 ?x_120 | |
| [class_instances] (19) ?x_120 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (19) ?x_120 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (16) ?x_112 : nonzero_comm_ring G := @integral_domain.to_nonzero_comm_ring ?x_113 ?x_114 | |
| [class_instances] (17) ?x_114 : integral_domain G := real.integral_domain | |
| failed is_def_eq | |
| [class_instances] (17) ?x_114 : integral_domain G := @polynomial.integral_domain ?x_115 ?x_116 | |
| failed is_def_eq | |
| [class_instances] (17) ?x_114 : integral_domain G := @ideal.quotient.integral_domain ?x_117 ?x_118 ?x_119 ?x_120 | |
| failed is_def_eq | |
| [class_instances] (17) ?x_114 : integral_domain G := @subring.domain ?x_121 ?x_122 ?x_123 ?x_124 | |
| failed is_def_eq | |
| [class_instances] (17) ?x_114 : integral_domain G := rat.integral_domain | |
| failed is_def_eq | |
| [class_instances] (17) ?x_114 : integral_domain G := @principal_ideal_domain.to_integral_domain ?x_125 ?x_126 | |
| [class_instances] (18) ?x_126 : principal_ideal_domain G := @euclidean_domain.to_principal_ideal_domain ?x_127 ?x_128 | |
| [class_instances] (19) ?x_128 : euclidean_domain G := @polynomial.euclidean_domain ?x_129 ?x_130 | |
| failed is_def_eq | |
| [class_instances] (19) ?x_128 : euclidean_domain G := int.euclidean_domain | |
| failed is_def_eq | |
| [class_instances] (19) ?x_128 : euclidean_domain G := @discrete_field.to_euclidean_domain ?x_131 ?x_132 | |
| [class_instances] (20) ?x_132 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (20) ?x_132 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (20) ?x_132 : discrete_field G := @local_ring.residue_field.discrete_field ?x_133 ?x_134 | |
| failed is_def_eq | |
| [class_instances] (20) ?x_132 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (20) ?x_132 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_135 ?x_136 | |
| [class_instances] (21) ?x_136 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (21) ?x_136 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (17) ?x_114 : integral_domain G := @euclidean_domain.integral_domain ?x_115 ?x_116 | |
| [class_instances] (18) ?x_116 : euclidean_domain G := @polynomial.euclidean_domain ?x_117 ?x_118 | |
| failed is_def_eq | |
| [class_instances] (18) ?x_116 : euclidean_domain G := int.euclidean_domain | |
| failed is_def_eq | |
| [class_instances] (18) ?x_116 : euclidean_domain G := @discrete_field.to_euclidean_domain ?x_119 ?x_120 | |
| [class_instances] (19) ?x_120 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (19) ?x_120 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (19) ?x_120 : discrete_field G := @local_ring.residue_field.discrete_field ?x_121 ?x_122 | |
| failed is_def_eq | |
| [class_instances] (19) ?x_120 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (19) ?x_120 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_123 ?x_124 | |
| [class_instances] (20) ?x_124 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (20) ?x_124 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (17) ?x_114 : integral_domain G := @normalization_domain.to_integral_domain ?x_115 ?x_116 | |
| [class_instances] (18) ?x_116 : normalization_domain G := @polynomial.normalization_domain ?x_117 ?x_118 | |
| failed is_def_eq | |
| [class_instances] (18) ?x_116 : normalization_domain G := int.normalization_domain | |
| failed is_def_eq | |
| [class_instances] (18) ?x_116 : normalization_domain G := @gcd_domain.to_normalization_domain ?x_119 ?x_120 | |
| [class_instances] (19) ?x_120 : gcd_domain G := int.gcd_domain | |
| failed is_def_eq | |
| [class_instances] (17) ?x_114 : integral_domain G := @field.to_integral_domain ?x_115 ?x_116 | |
| [class_instances] (18) ?x_116 : field G := real.field | |
| failed is_def_eq | |
| [class_instances] (18) ?x_116 : field G := rat.field | |
| failed is_def_eq | |
| [class_instances] (18) ?x_116 : field G := @linear_ordered_field.to_field ?x_117 ?x_118 | |
| [class_instances] (19) ?x_118 : linear_ordered_field G := real.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (19) ?x_118 : linear_ordered_field G := rat.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (19) ?x_118 : linear_ordered_field G := @discrete_linear_ordered_field.to_linear_ordered_field ?x_119 ?x_120 | |
| [class_instances] (20) ?x_120 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (20) ?x_120 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (18) ?x_116 : field G := @discrete_field.to_field ?x_117 ?x_118 | |
| [class_instances] (19) ?x_118 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (19) ?x_118 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (19) ?x_118 : discrete_field G := @local_ring.residue_field.discrete_field ?x_119 ?x_120 | |
| failed is_def_eq | |
| [class_instances] (19) ?x_118 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (19) ?x_118 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_121 ?x_122 | |
| [class_instances] (20) ?x_122 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (20) ?x_122 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (17) ?x_114 : integral_domain G := @discrete_field.to_integral_domain ?x_115 ?x_116 ?x_117 | |
| [class_instances] (18) ?x_116 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (18) ?x_116 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (18) ?x_116 : discrete_field G := @local_ring.residue_field.discrete_field ?x_118 ?x_119 | |
| failed is_def_eq | |
| [class_instances] (18) ?x_116 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (18) ?x_116 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_120 ?x_121 | |
| [class_instances] (19) ?x_121 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (19) ?x_121 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (17) ?x_114 : integral_domain G := @linear_ordered_comm_ring.to_integral_domain ?x_115 ?x_116 | |
| [class_instances] (18) ?x_116 : linear_ordered_comm_ring G := real.linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (18) ?x_116 : linear_ordered_comm_ring G := rat.linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (18) ?x_116 : linear_ordered_comm_ring G := @decidable_linear_ordered_comm_ring.to_linear_ordered_comm_ring ?x_117 ?x_118 | |
| [class_instances] (19) ?x_118 : decidable_linear_ordered_comm_ring G := real.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (19) ?x_118 : decidable_linear_ordered_comm_ring G := rat.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (19) ?x_118 : decidable_linear_ordered_comm_ring G := int.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (19) ?x_118 : decidable_linear_ordered_comm_ring G := @discrete_linear_ordered_field.to_decidable_linear_ordered_comm_ring ?x_119 ?x_120 | |
| [class_instances] (20) ?x_120 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (20) ?x_120 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (19) ?x_118 : decidable_linear_ordered_comm_ring G := @linear_nonneg_ring.to_decidable_linear_ordered_comm_ring ?x_119 ?x_120 ?x_121 ?x_122 | |
| [class_instances] (15) ?x_55 : comm_ring G := @field.to_comm_ring ?x_56 ?x_57 | |
| [class_instances] (16) ?x_57 : field G := real.field | |
| failed is_def_eq | |
| [class_instances] (16) ?x_57 : field G := rat.field | |
| failed is_def_eq | |
| [class_instances] (16) ?x_57 : field G := @linear_ordered_field.to_field ?x_58 ?x_59 | |
| [class_instances] (17) ?x_59 : linear_ordered_field G := real.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (17) ?x_59 : linear_ordered_field G := rat.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (17) ?x_59 : linear_ordered_field G := @discrete_linear_ordered_field.to_linear_ordered_field ?x_60 ?x_61 | |
| [class_instances] (18) ?x_61 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (18) ?x_61 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (16) ?x_57 : field G := @discrete_field.to_field ?x_58 ?x_59 | |
| [class_instances] (17) ?x_59 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (17) ?x_59 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (17) ?x_59 : discrete_field G := @local_ring.residue_field.discrete_field ?x_60 ?x_61 | |
| failed is_def_eq | |
| [class_instances] (17) ?x_59 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (17) ?x_59 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_62 ?x_63 | |
| [class_instances] (18) ?x_63 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (18) ?x_63 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (15) ?x_55 : comm_ring G := @integral_domain.to_comm_ring ?x_56 ?x_57 | |
| [class_instances] (16) ?x_57 : integral_domain G := real.integral_domain | |
| failed is_def_eq | |
| [class_instances] (16) ?x_57 : integral_domain G := @polynomial.integral_domain ?x_58 ?x_59 | |
| failed is_def_eq | |
| [class_instances] (16) ?x_57 : integral_domain G := @ideal.quotient.integral_domain ?x_60 ?x_61 ?x_62 ?x_63 | |
| failed is_def_eq | |
| [class_instances] (16) ?x_57 : integral_domain G := @subring.domain ?x_64 ?x_65 ?x_66 ?x_67 | |
| failed is_def_eq | |
| [class_instances] (16) ?x_57 : integral_domain G := rat.integral_domain | |
| failed is_def_eq | |
| [class_instances] (16) ?x_57 : integral_domain G := @principal_ideal_domain.to_integral_domain ?x_68 ?x_69 | |
| [class_instances] (17) ?x_69 : principal_ideal_domain G := @euclidean_domain.to_principal_ideal_domain ?x_70 ?x_71 | |
| [class_instances] (18) ?x_71 : euclidean_domain G := @polynomial.euclidean_domain ?x_72 ?x_73 | |
| failed is_def_eq | |
| [class_instances] (18) ?x_71 : euclidean_domain G := int.euclidean_domain | |
| failed is_def_eq | |
| [class_instances] (18) ?x_71 : euclidean_domain G := @discrete_field.to_euclidean_domain ?x_74 ?x_75 | |
| [class_instances] (19) ?x_75 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (19) ?x_75 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (19) ?x_75 : discrete_field G := @local_ring.residue_field.discrete_field ?x_76 ?x_77 | |
| failed is_def_eq | |
| [class_instances] (19) ?x_75 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (19) ?x_75 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_78 ?x_79 | |
| [class_instances] (20) ?x_79 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (20) ?x_79 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (16) ?x_57 : integral_domain G := @euclidean_domain.integral_domain ?x_58 ?x_59 | |
| [class_instances] (17) ?x_59 : euclidean_domain G := @polynomial.euclidean_domain ?x_60 ?x_61 | |
| failed is_def_eq | |
| [class_instances] (17) ?x_59 : euclidean_domain G := int.euclidean_domain | |
| failed is_def_eq | |
| [class_instances] (17) ?x_59 : euclidean_domain G := @discrete_field.to_euclidean_domain ?x_62 ?x_63 | |
| [class_instances] (18) ?x_63 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (18) ?x_63 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (18) ?x_63 : discrete_field G := @local_ring.residue_field.discrete_field ?x_64 ?x_65 | |
| failed is_def_eq | |
| [class_instances] (18) ?x_63 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (18) ?x_63 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_66 ?x_67 | |
| [class_instances] (19) ?x_67 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (19) ?x_67 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (16) ?x_57 : integral_domain G := @normalization_domain.to_integral_domain ?x_58 ?x_59 | |
| [class_instances] (17) ?x_59 : normalization_domain G := @polynomial.normalization_domain ?x_60 ?x_61 | |
| failed is_def_eq | |
| [class_instances] (17) ?x_59 : normalization_domain G := int.normalization_domain | |
| failed is_def_eq | |
| [class_instances] (17) ?x_59 : normalization_domain G := @gcd_domain.to_normalization_domain ?x_62 ?x_63 | |
| [class_instances] (18) ?x_63 : gcd_domain G := int.gcd_domain | |
| failed is_def_eq | |
| [class_instances] (16) ?x_57 : integral_domain G := @field.to_integral_domain ?x_58 ?x_59 | |
| [class_instances] (17) ?x_59 : field G := real.field | |
| failed is_def_eq | |
| [class_instances] (17) ?x_59 : field G := rat.field | |
| failed is_def_eq | |
| [class_instances] (17) ?x_59 : field G := @linear_ordered_field.to_field ?x_60 ?x_61 | |
| [class_instances] (18) ?x_61 : linear_ordered_field G := real.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (18) ?x_61 : linear_ordered_field G := rat.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (18) ?x_61 : linear_ordered_field G := @discrete_linear_ordered_field.to_linear_ordered_field ?x_62 ?x_63 | |
| [class_instances] (19) ?x_63 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (19) ?x_63 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (17) ?x_59 : field G := @discrete_field.to_field ?x_60 ?x_61 | |
| [class_instances] (18) ?x_61 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (18) ?x_61 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (18) ?x_61 : discrete_field G := @local_ring.residue_field.discrete_field ?x_62 ?x_63 | |
| failed is_def_eq | |
| [class_instances] (18) ?x_61 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (18) ?x_61 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_64 ?x_65 | |
| [class_instances] (19) ?x_65 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (19) ?x_65 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (16) ?x_57 : integral_domain G := @discrete_field.to_integral_domain ?x_58 ?x_59 ?x_60 | |
| [class_instances] (17) ?x_59 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (17) ?x_59 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (17) ?x_59 : discrete_field G := @local_ring.residue_field.discrete_field ?x_61 ?x_62 | |
| failed is_def_eq | |
| [class_instances] (17) ?x_59 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (17) ?x_59 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_63 ?x_64 | |
| [class_instances] (18) ?x_64 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (18) ?x_64 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (16) ?x_57 : integral_domain G := @linear_ordered_comm_ring.to_integral_domain ?x_58 ?x_59 | |
| [class_instances] (17) ?x_59 : linear_ordered_comm_ring G := real.linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (17) ?x_59 : linear_ordered_comm_ring G := rat.linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (17) ?x_59 : linear_ordered_comm_ring G := @decidable_linear_ordered_comm_ring.to_linear_ordered_comm_ring ?x_60 ?x_61 | |
| [class_instances] (18) ?x_61 : decidable_linear_ordered_comm_ring G := real.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (18) ?x_61 : decidable_linear_ordered_comm_ring G := rat.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (18) ?x_61 : decidable_linear_ordered_comm_ring G := int.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (18) ?x_61 : decidable_linear_ordered_comm_ring G := @discrete_linear_ordered_field.to_decidable_linear_ordered_comm_ring ?x_62 ?x_63 | |
| [class_instances] (19) ?x_63 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (19) ?x_63 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (18) ?x_61 : decidable_linear_ordered_comm_ring G := @linear_nonneg_ring.to_decidable_linear_ordered_comm_ring ?x_62 ?x_63 ?x_64 ?x_65 | |
| [class_instances] (14) ?x_53 : _root_.reversible G := @ @_root_.reversible_of_reduced ?x_54 ?x_55 | |
| [class_instances] (14) ?x_53 : _root_.reversible G := @ @_root_.reversible_of_domain ?x_54 ?x_55 | |
| [class_instances] (15) ?x_55 : domain G := real.domain | |
| failed is_def_eq | |
| [class_instances] (15) ?x_55 : domain G := @division_ring.to_domain ?x_56 ?x_57 | |
| [class_instances] (16) ?x_57 : division_ring G := real.division_ring | |
| failed is_def_eq | |
| [class_instances] (16) ?x_57 : division_ring G := rat.division_ring | |
| failed is_def_eq | |
| [class_instances] (16) ?x_57 : division_ring G := @field.to_division_ring ?x_58 ?x_59 | |
| [class_instances] (17) ?x_59 : field G := real.field | |
| failed is_def_eq | |
| [class_instances] (17) ?x_59 : field G := rat.field | |
| failed is_def_eq | |
| [class_instances] (17) ?x_59 : field G := @linear_ordered_field.to_field ?x_60 ?x_61 | |
| [class_instances] (18) ?x_61 : linear_ordered_field G := real.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (18) ?x_61 : linear_ordered_field G := rat.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (18) ?x_61 : linear_ordered_field G := @discrete_linear_ordered_field.to_linear_ordered_field ?x_62 ?x_63 | |
| [class_instances] (19) ?x_63 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (19) ?x_63 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (17) ?x_59 : field G := @discrete_field.to_field ?x_60 ?x_61 | |
| [class_instances] (18) ?x_61 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (18) ?x_61 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (18) ?x_61 : discrete_field G := @local_ring.residue_field.discrete_field ?x_62 ?x_63 | |
| failed is_def_eq | |
| [class_instances] (18) ?x_61 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (18) ?x_61 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_64 ?x_65 | |
| [class_instances] (19) ?x_65 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (19) ?x_65 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (15) ?x_55 : domain G := @linear_nonneg_ring.to_domain ?x_56 ?x_57 | |
| [class_instances] (15) ?x_55 : domain G := @linear_ordered_ring.to_domain ?x_56 ?x_57 | |
| [class_instances] (16) ?x_57 : linear_ordered_ring G := real.linear_ordered_ring | |
| failed is_def_eq | |
| [class_instances] (16) ?x_57 : linear_ordered_ring G := rat.linear_ordered_ring | |
| failed is_def_eq | |
| [class_instances] (16) ?x_57 : linear_ordered_ring G := @linear_ordered_field.to_linear_ordered_ring ?x_58 ?x_59 | |
| [class_instances] (17) ?x_59 : linear_ordered_field G := real.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (17) ?x_59 : linear_ordered_field G := rat.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (17) ?x_59 : linear_ordered_field G := @discrete_linear_ordered_field.to_linear_ordered_field ?x_60 ?x_61 | |
| [class_instances] (18) ?x_61 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (18) ?x_61 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (16) ?x_57 : linear_ordered_ring G := @linear_nonneg_ring.to_linear_ordered_ring ?x_58 ?x_59 | |
| [class_instances] (16) ?x_57 : linear_ordered_ring G := @linear_ordered_comm_ring.to_linear_ordered_ring ?x_58 ?x_59 | |
| [class_instances] (17) ?x_59 : linear_ordered_comm_ring G := real.linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (17) ?x_59 : linear_ordered_comm_ring G := rat.linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (17) ?x_59 : linear_ordered_comm_ring G := @decidable_linear_ordered_comm_ring.to_linear_ordered_comm_ring ?x_60 ?x_61 | |
| [class_instances] (18) ?x_61 : decidable_linear_ordered_comm_ring G := real.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (18) ?x_61 : decidable_linear_ordered_comm_ring G := rat.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (18) ?x_61 : decidable_linear_ordered_comm_ring G := int.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (18) ?x_61 : decidable_linear_ordered_comm_ring G := @discrete_linear_ordered_field.to_decidable_linear_ordered_comm_ring ?x_62 ?x_63 | |
| [class_instances] (19) ?x_63 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (19) ?x_63 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (18) ?x_61 : decidable_linear_ordered_comm_ring G := @linear_nonneg_ring.to_decidable_linear_ordered_comm_ring ?x_62 ?x_63 ?x_64 ?x_65 | |
| [class_instances] (15) ?x_55 : domain G := @integral_domain.to_domain ?x_56 ?x_57 | |
| [class_instances] (16) ?x_57 : integral_domain G := real.integral_domain | |
| failed is_def_eq | |
| [class_instances] (16) ?x_57 : integral_domain G := @polynomial.integral_domain ?x_58 ?x_59 | |
| failed is_def_eq | |
| [class_instances] (16) ?x_57 : integral_domain G := @ideal.quotient.integral_domain ?x_60 ?x_61 ?x_62 ?x_63 | |
| failed is_def_eq | |
| [class_instances] (16) ?x_57 : integral_domain G := @subring.domain ?x_64 ?x_65 ?x_66 ?x_67 | |
| failed is_def_eq | |
| [class_instances] (16) ?x_57 : integral_domain G := rat.integral_domain | |
| failed is_def_eq | |
| [class_instances] (16) ?x_57 : integral_domain G := @principal_ideal_domain.to_integral_domain ?x_68 ?x_69 | |
| [class_instances] (17) ?x_69 : principal_ideal_domain G := @euclidean_domain.to_principal_ideal_domain ?x_70 ?x_71 | |
| [class_instances] (18) ?x_71 : euclidean_domain G := @polynomial.euclidean_domain ?x_72 ?x_73 | |
| failed is_def_eq | |
| [class_instances] (18) ?x_71 : euclidean_domain G := int.euclidean_domain | |
| failed is_def_eq | |
| [class_instances] (18) ?x_71 : euclidean_domain G := @discrete_field.to_euclidean_domain ?x_74 ?x_75 | |
| [class_instances] (19) ?x_75 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (19) ?x_75 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (19) ?x_75 : discrete_field G := @local_ring.residue_field.discrete_field ?x_76 ?x_77 | |
| failed is_def_eq | |
| [class_instances] (19) ?x_75 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (19) ?x_75 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_78 ?x_79 | |
| [class_instances] (20) ?x_79 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (20) ?x_79 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (16) ?x_57 : integral_domain G := @euclidean_domain.integral_domain ?x_58 ?x_59 | |
| [class_instances] (17) ?x_59 : euclidean_domain G := @polynomial.euclidean_domain ?x_60 ?x_61 | |
| failed is_def_eq | |
| [class_instances] (17) ?x_59 : euclidean_domain G := int.euclidean_domain | |
| failed is_def_eq | |
| [class_instances] (17) ?x_59 : euclidean_domain G := @discrete_field.to_euclidean_domain ?x_62 ?x_63 | |
| [class_instances] (18) ?x_63 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (18) ?x_63 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (18) ?x_63 : discrete_field G := @local_ring.residue_field.discrete_field ?x_64 ?x_65 | |
| failed is_def_eq | |
| [class_instances] (18) ?x_63 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (18) ?x_63 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_66 ?x_67 | |
| [class_instances] (19) ?x_67 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (19) ?x_67 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (16) ?x_57 : integral_domain G := @normalization_domain.to_integral_domain ?x_58 ?x_59 | |
| [class_instances] (17) ?x_59 : normalization_domain G := @polynomial.normalization_domain ?x_60 ?x_61 | |
| failed is_def_eq | |
| [class_instances] (17) ?x_59 : normalization_domain G := int.normalization_domain | |
| failed is_def_eq | |
| [class_instances] (17) ?x_59 : normalization_domain G := @gcd_domain.to_normalization_domain ?x_62 ?x_63 | |
| [class_instances] (18) ?x_63 : gcd_domain G := int.gcd_domain | |
| failed is_def_eq | |
| [class_instances] (16) ?x_57 : integral_domain G := @field.to_integral_domain ?x_58 ?x_59 | |
| [class_instances] (17) ?x_59 : field G := real.field | |
| failed is_def_eq | |
| [class_instances] (17) ?x_59 : field G := rat.field | |
| failed is_def_eq | |
| [class_instances] (17) ?x_59 : field G := @linear_ordered_field.to_field ?x_60 ?x_61 | |
| [class_instances] (18) ?x_61 : linear_ordered_field G := real.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (18) ?x_61 : linear_ordered_field G := rat.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (18) ?x_61 : linear_ordered_field G := @discrete_linear_ordered_field.to_linear_ordered_field ?x_62 ?x_63 | |
| [class_instances] (19) ?x_63 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (19) ?x_63 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (17) ?x_59 : field G := @discrete_field.to_field ?x_60 ?x_61 | |
| [class_instances] (18) ?x_61 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (18) ?x_61 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (18) ?x_61 : discrete_field G := @local_ring.residue_field.discrete_field ?x_62 ?x_63 | |
| failed is_def_eq | |
| [class_instances] (18) ?x_61 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (18) ?x_61 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_64 ?x_65 | |
| [class_instances] (19) ?x_65 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (19) ?x_65 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (16) ?x_57 : integral_domain G := @discrete_field.to_integral_domain ?x_58 ?x_59 ?x_60 | |
| [class_instances] (17) ?x_59 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (17) ?x_59 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (17) ?x_59 : discrete_field G := @local_ring.residue_field.discrete_field ?x_61 ?x_62 | |
| failed is_def_eq | |
| [class_instances] (17) ?x_59 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (17) ?x_59 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_63 ?x_64 | |
| [class_instances] (18) ?x_64 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (18) ?x_64 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (16) ?x_57 : integral_domain G := @linear_ordered_comm_ring.to_integral_domain ?x_58 ?x_59 | |
| [class_instances] (17) ?x_59 : linear_ordered_comm_ring G := real.linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (17) ?x_59 : linear_ordered_comm_ring G := rat.linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (17) ?x_59 : linear_ordered_comm_ring G := @decidable_linear_ordered_comm_ring.to_linear_ordered_comm_ring ?x_60 ?x_61 | |
| [class_instances] (18) ?x_61 : decidable_linear_ordered_comm_ring G := real.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (18) ?x_61 : decidable_linear_ordered_comm_ring G := rat.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (18) ?x_61 : decidable_linear_ordered_comm_ring G := int.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (18) ?x_61 : decidable_linear_ordered_comm_ring G := @discrete_linear_ordered_field.to_decidable_linear_ordered_comm_ring ?x_62 ?x_63 | |
| [class_instances] (19) ?x_63 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (19) ?x_63 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (18) ?x_61 : decidable_linear_ordered_comm_ring G := @linear_nonneg_ring.to_decidable_linear_ordered_comm_ring ?x_62 ?x_63 ?x_64 ?x_65 | |
| [class_instances] (13) ?x_50 : ring G := @ @reduced.to_ring ?x_52 ?x_53 | |
| [class_instances] (13) ?x_50 : ring G := @dedekind_finite.to_ring ?x_52 ?x_53 | |
| [class_instances] (14) ?x_53 : dedekind_finite G := @pi.dedekind_finite ?x_54 ?x_55 ?x_56 | |
| failed is_def_eq | |
| [class_instances] (14) ?x_53 : dedekind_finite G := @ @_root_.dedekind_finite_of_noetherian ?x_57 ?x_58 ?x_59 | |
| [class_instances] (15) ?x_58 : ring G := @ @reversible.to_ring ?x_60 ?x_61 | |
| [class_instances] (16) ?x_61 : _root_.reversible G := @ @_root_.reversible_of_comm_ring ?x_62 ?x_63 | |
| [class_instances] (17) ?x_63 : comm_ring G := @subalgebra.comm_ring ?x_64 ?x_65 ?x_66 ?x_67 ?x_68 ?x_69 | |
| failed is_def_eq | |
| [class_instances] (17) ?x_63 : comm_ring G := @algebra.comap.comm_ring ?x_70 ?x_71 ?x_72 ?x_73 ?x_74 ?x_75 ?x_76 ?x_77 | |
| failed is_def_eq | |
| [class_instances] (17) ?x_63 : comm_ring G := complex.comm_ring | |
| failed is_def_eq | |
| [class_instances] (17) ?x_63 : comm_ring G := real.comm_ring | |
| failed is_def_eq | |
| [class_instances] (17) ?x_63 : comm_ring G := @cau_seq.completion.comm_ring ?x_78 ?x_79 ?x_80 ?x_81 ?x_82 ?x_83 | |
| failed is_def_eq | |
| [class_instances] (17) ?x_63 : comm_ring G := @cau_seq.comm_ring ?x_84 ?x_85 ?x_86 ?x_87 ?x_88 ?x_89 | |
| failed is_def_eq | |
| [class_instances] (17) ?x_63 : comm_ring G := @mv_polynomial.comm_ring ?x_90 ?x_91 ?x_92 | |
| failed is_def_eq | |
| [class_instances] (17) ?x_63 : comm_ring G := @polynomial.comm_ring ?x_93 ?x_94 | |
| failed is_def_eq | |
| [class_instances] (17) ?x_63 : comm_ring G := @free_abelian_group.comm_ring ?x_95 ?x_96 | |
| failed is_def_eq | |
| [class_instances] (17) ?x_63 : comm_ring G := @ideal.quotient.comm_ring ?x_97 ?x_98 ?x_99 | |
| failed is_def_eq | |
| [class_instances] (17) ?x_63 : comm_ring G := @finsupp.comm_ring ?x_100 ?x_101 ?x_102 ?x_103 | |
| failed is_def_eq | |
| [class_instances] (17) ?x_63 : comm_ring G := @prod.comm_ring ?x_104 ?x_105 ?x_106 ?x_107 | |
| failed is_def_eq | |
| [class_instances] (17) ?x_63 : comm_ring G := @pi.comm_ring ?x_108 ?x_109 ?x_110 | |
| failed is_def_eq | |
| [class_instances] (17) ?x_63 : comm_ring G := @subtype.comm_ring ?x_111 ?x_112 ?x_113 ?x_114 | |
| failed is_def_eq | |
| [class_instances] (17) ?x_63 : comm_ring G := @subset.comm_ring ?x_115 ?x_116 ?x_117 ?x_118 | |
| failed is_def_eq | |
| [class_instances] (17) ?x_63 : comm_ring G := rat.comm_ring | |
| failed is_def_eq | |
| [class_instances] (17) ?x_63 : comm_ring G := int.comm_ring | |
| failed is_def_eq | |
| [class_instances] (17) ?x_63 : comm_ring G := @nonzero_comm_ring.to_comm_ring ?x_119 ?x_120 | |
| [class_instances] (18) ?x_120 : nonzero_comm_ring G := real.nonzero_comm_ring | |
| failed is_def_eq | |
| [class_instances] (18) ?x_120 : nonzero_comm_ring G := @polynomial.nonzero_comm_ring ?x_121 ?x_122 | |
| failed is_def_eq | |
| [class_instances] (18) ?x_120 : nonzero_comm_ring G := @prod.nonzero_comm_ring ?x_123 ?x_124 ?x_125 ?x_126 | |
| failed is_def_eq | |
| [class_instances] (18) ?x_120 : nonzero_comm_ring G := rat.nonzero_comm_ring | |
| failed is_def_eq | |
| [class_instances] (18) ?x_120 : nonzero_comm_ring G := @euclidean_domain.to_nonzero_comm_ring ?x_127 ?x_128 | |
| [class_instances] (19) ?x_128 : euclidean_domain G := @polynomial.euclidean_domain ?x_129 ?x_130 | |
| failed is_def_eq | |
| [class_instances] (19) ?x_128 : euclidean_domain G := int.euclidean_domain | |
| failed is_def_eq | |
| [class_instances] (19) ?x_128 : euclidean_domain G := @discrete_field.to_euclidean_domain ?x_131 ?x_132 | |
| [class_instances] (20) ?x_132 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (20) ?x_132 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (20) ?x_132 : discrete_field G := @local_ring.residue_field.discrete_field ?x_133 ?x_134 | |
| failed is_def_eq | |
| [class_instances] (20) ?x_132 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (20) ?x_132 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_135 ?x_136 | |
| [class_instances] (21) ?x_136 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (21) ?x_136 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (18) ?x_120 : nonzero_comm_ring G := @local_ring.to_nonzero_comm_ring ?x_121 ?x_122 | |
| [class_instances] (19) ?x_122 : local_ring G := @discrete_field.local_ring ?x_123 ?x_124 | |
| [class_instances] (20) ?x_124 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (20) ?x_124 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (20) ?x_124 : discrete_field G := @local_ring.residue_field.discrete_field ?x_125 ?x_126 | |
| failed is_def_eq | |
| [class_instances] (20) ?x_124 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (20) ?x_124 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_127 ?x_128 | |
| [class_instances] (21) ?x_128 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (21) ?x_128 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (18) ?x_120 : nonzero_comm_ring G := @integral_domain.to_nonzero_comm_ring ?x_121 ?x_122 | |
| [class_instances] (19) ?x_122 : integral_domain G := real.integral_domain | |
| failed is_def_eq | |
| [class_instances] (19) ?x_122 : integral_domain G := @polynomial.integral_domain ?x_123 ?x_124 | |
| failed is_def_eq | |
| [class_instances] (19) ?x_122 : integral_domain G := @ideal.quotient.integral_domain ?x_125 ?x_126 ?x_127 ?x_128 | |
| failed is_def_eq | |
| [class_instances] (19) ?x_122 : integral_domain G := @subring.domain ?x_129 ?x_130 ?x_131 ?x_132 | |
| failed is_def_eq | |
| [class_instances] (19) ?x_122 : integral_domain G := rat.integral_domain | |
| failed is_def_eq | |
| [class_instances] (19) ?x_122 : integral_domain G := @principal_ideal_domain.to_integral_domain ?x_133 ?x_134 | |
| [class_instances] (20) ?x_134 : principal_ideal_domain G := @euclidean_domain.to_principal_ideal_domain ?x_135 ?x_136 | |
| [class_instances] (21) ?x_136 : euclidean_domain G := @polynomial.euclidean_domain ?x_137 ?x_138 | |
| failed is_def_eq | |
| [class_instances] (21) ?x_136 : euclidean_domain G := int.euclidean_domain | |
| failed is_def_eq | |
| [class_instances] (21) ?x_136 : euclidean_domain G := @discrete_field.to_euclidean_domain ?x_139 ?x_140 | |
| [class_instances] (22) ?x_140 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (22) ?x_140 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (22) ?x_140 : discrete_field G := @local_ring.residue_field.discrete_field ?x_141 ?x_142 | |
| failed is_def_eq | |
| [class_instances] (22) ?x_140 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (22) ?x_140 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_143 ?x_144 | |
| [class_instances] (23) ?x_144 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (23) ?x_144 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (19) ?x_122 : integral_domain G := @euclidean_domain.integral_domain ?x_123 ?x_124 | |
| [class_instances] (20) ?x_124 : euclidean_domain G := @polynomial.euclidean_domain ?x_125 ?x_126 | |
| failed is_def_eq | |
| [class_instances] (20) ?x_124 : euclidean_domain G := int.euclidean_domain | |
| failed is_def_eq | |
| [class_instances] (20) ?x_124 : euclidean_domain G := @discrete_field.to_euclidean_domain ?x_127 ?x_128 | |
| [class_instances] (21) ?x_128 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (21) ?x_128 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (21) ?x_128 : discrete_field G := @local_ring.residue_field.discrete_field ?x_129 ?x_130 | |
| failed is_def_eq | |
| [class_instances] (21) ?x_128 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (21) ?x_128 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_131 ?x_132 | |
| [class_instances] (22) ?x_132 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (22) ?x_132 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (19) ?x_122 : integral_domain G := @normalization_domain.to_integral_domain ?x_123 ?x_124 | |
| [class_instances] (20) ?x_124 : normalization_domain G := @polynomial.normalization_domain ?x_125 ?x_126 | |
| failed is_def_eq | |
| [class_instances] (20) ?x_124 : normalization_domain G := int.normalization_domain | |
| failed is_def_eq | |
| [class_instances] (20) ?x_124 : normalization_domain G := @gcd_domain.to_normalization_domain ?x_127 ?x_128 | |
| [class_instances] (21) ?x_128 : gcd_domain G := int.gcd_domain | |
| failed is_def_eq | |
| [class_instances] (19) ?x_122 : integral_domain G := @field.to_integral_domain ?x_123 ?x_124 | |
| [class_instances] (20) ?x_124 : field G := real.field | |
| failed is_def_eq | |
| [class_instances] (20) ?x_124 : field G := rat.field | |
| failed is_def_eq | |
| [class_instances] (20) ?x_124 : field G := @linear_ordered_field.to_field ?x_125 ?x_126 | |
| [class_instances] (21) ?x_126 : linear_ordered_field G := real.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (21) ?x_126 : linear_ordered_field G := rat.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (21) ?x_126 : linear_ordered_field G := @discrete_linear_ordered_field.to_linear_ordered_field ?x_127 ?x_128 | |
| [class_instances] (22) ?x_128 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (22) ?x_128 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (20) ?x_124 : field G := @discrete_field.to_field ?x_125 ?x_126 | |
| [class_instances] (21) ?x_126 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (21) ?x_126 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (21) ?x_126 : discrete_field G := @local_ring.residue_field.discrete_field ?x_127 ?x_128 | |
| failed is_def_eq | |
| [class_instances] (21) ?x_126 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (21) ?x_126 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_129 ?x_130 | |
| [class_instances] (22) ?x_130 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (22) ?x_130 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (19) ?x_122 : integral_domain G := @discrete_field.to_integral_domain ?x_123 ?x_124 ?x_125 | |
| [class_instances] (20) ?x_124 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (20) ?x_124 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (20) ?x_124 : discrete_field G := @local_ring.residue_field.discrete_field ?x_126 ?x_127 | |
| failed is_def_eq | |
| [class_instances] (20) ?x_124 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (20) ?x_124 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_128 ?x_129 | |
| [class_instances] (21) ?x_129 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (21) ?x_129 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (19) ?x_122 : integral_domain G := @linear_ordered_comm_ring.to_integral_domain ?x_123 ?x_124 | |
| [class_instances] (20) ?x_124 : linear_ordered_comm_ring G := real.linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (20) ?x_124 : linear_ordered_comm_ring G := rat.linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (20) ?x_124 : linear_ordered_comm_ring G := @decidable_linear_ordered_comm_ring.to_linear_ordered_comm_ring ?x_125 ?x_126 | |
| [class_instances] (21) ?x_126 : decidable_linear_ordered_comm_ring G := real.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (21) ?x_126 : decidable_linear_ordered_comm_ring G := rat.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (21) ?x_126 : decidable_linear_ordered_comm_ring G := int.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (21) ?x_126 : decidable_linear_ordered_comm_ring G := @discrete_linear_ordered_field.to_decidable_linear_ordered_comm_ring ?x_127 ?x_128 | |
| [class_instances] (22) ?x_128 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (22) ?x_128 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (21) ?x_126 : decidable_linear_ordered_comm_ring G := @linear_nonneg_ring.to_decidable_linear_ordered_comm_ring ?x_127 ?x_128 ?x_129 ?x_130 | |
| [class_instances] (17) ?x_63 : comm_ring G := @field.to_comm_ring ?x_64 ?x_65 | |
| [class_instances] (18) ?x_65 : field G := real.field | |
| failed is_def_eq | |
| [class_instances] (18) ?x_65 : field G := rat.field | |
| failed is_def_eq | |
| [class_instances] (18) ?x_65 : field G := @linear_ordered_field.to_field ?x_66 ?x_67 | |
| [class_instances] (19) ?x_67 : linear_ordered_field G := real.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (19) ?x_67 : linear_ordered_field G := rat.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (19) ?x_67 : linear_ordered_field G := @discrete_linear_ordered_field.to_linear_ordered_field ?x_68 ?x_69 | |
| [class_instances] (20) ?x_69 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (20) ?x_69 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (18) ?x_65 : field G := @discrete_field.to_field ?x_66 ?x_67 | |
| [class_instances] (19) ?x_67 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (19) ?x_67 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (19) ?x_67 : discrete_field G := @local_ring.residue_field.discrete_field ?x_68 ?x_69 | |
| failed is_def_eq | |
| [class_instances] (19) ?x_67 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (19) ?x_67 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_70 ?x_71 | |
| [class_instances] (20) ?x_71 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (20) ?x_71 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (17) ?x_63 : comm_ring G := @integral_domain.to_comm_ring ?x_64 ?x_65 | |
| [class_instances] (18) ?x_65 : integral_domain G := real.integral_domain | |
| failed is_def_eq | |
| [class_instances] (18) ?x_65 : integral_domain G := @polynomial.integral_domain ?x_66 ?x_67 | |
| failed is_def_eq | |
| [class_instances] (18) ?x_65 : integral_domain G := @ideal.quotient.integral_domain ?x_68 ?x_69 ?x_70 ?x_71 | |
| failed is_def_eq | |
| [class_instances] (18) ?x_65 : integral_domain G := @subring.domain ?x_72 ?x_73 ?x_74 ?x_75 | |
| failed is_def_eq | |
| [class_instances] (18) ?x_65 : integral_domain G := rat.integral_domain | |
| failed is_def_eq | |
| [class_instances] (18) ?x_65 : integral_domain G := @principal_ideal_domain.to_integral_domain ?x_76 ?x_77 | |
| [class_instances] (19) ?x_77 : principal_ideal_domain G := @euclidean_domain.to_principal_ideal_domain ?x_78 ?x_79 | |
| [class_instances] (20) ?x_79 : euclidean_domain G := @polynomial.euclidean_domain ?x_80 ?x_81 | |
| failed is_def_eq | |
| [class_instances] (20) ?x_79 : euclidean_domain G := int.euclidean_domain | |
| failed is_def_eq | |
| [class_instances] (20) ?x_79 : euclidean_domain G := @discrete_field.to_euclidean_domain ?x_82 ?x_83 | |
| [class_instances] (21) ?x_83 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (21) ?x_83 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (21) ?x_83 : discrete_field G := @local_ring.residue_field.discrete_field ?x_84 ?x_85 | |
| failed is_def_eq | |
| [class_instances] (21) ?x_83 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (21) ?x_83 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_86 ?x_87 | |
| [class_instances] (22) ?x_87 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (22) ?x_87 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (18) ?x_65 : integral_domain G := @euclidean_domain.integral_domain ?x_66 ?x_67 | |
| [class_instances] (19) ?x_67 : euclidean_domain G := @polynomial.euclidean_domain ?x_68 ?x_69 | |
| failed is_def_eq | |
| [class_instances] (19) ?x_67 : euclidean_domain G := int.euclidean_domain | |
| failed is_def_eq | |
| [class_instances] (19) ?x_67 : euclidean_domain G := @discrete_field.to_euclidean_domain ?x_70 ?x_71 | |
| [class_instances] (20) ?x_71 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (20) ?x_71 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (20) ?x_71 : discrete_field G := @local_ring.residue_field.discrete_field ?x_72 ?x_73 | |
| failed is_def_eq | |
| [class_instances] (20) ?x_71 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (20) ?x_71 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_74 ?x_75 | |
| [class_instances] (21) ?x_75 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (21) ?x_75 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (18) ?x_65 : integral_domain G := @normalization_domain.to_integral_domain ?x_66 ?x_67 | |
| [class_instances] (19) ?x_67 : normalization_domain G := @polynomial.normalization_domain ?x_68 ?x_69 | |
| failed is_def_eq | |
| [class_instances] (19) ?x_67 : normalization_domain G := int.normalization_domain | |
| failed is_def_eq | |
| [class_instances] (19) ?x_67 : normalization_domain G := @gcd_domain.to_normalization_domain ?x_70 ?x_71 | |
| [class_instances] (20) ?x_71 : gcd_domain G := int.gcd_domain | |
| failed is_def_eq | |
| [class_instances] (18) ?x_65 : integral_domain G := @field.to_integral_domain ?x_66 ?x_67 | |
| [class_instances] (19) ?x_67 : field G := real.field | |
| failed is_def_eq | |
| [class_instances] (19) ?x_67 : field G := rat.field | |
| failed is_def_eq | |
| [class_instances] (19) ?x_67 : field G := @linear_ordered_field.to_field ?x_68 ?x_69 | |
| [class_instances] (20) ?x_69 : linear_ordered_field G := real.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (20) ?x_69 : linear_ordered_field G := rat.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (20) ?x_69 : linear_ordered_field G := @discrete_linear_ordered_field.to_linear_ordered_field ?x_70 ?x_71 | |
| [class_instances] (21) ?x_71 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (21) ?x_71 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (19) ?x_67 : field G := @discrete_field.to_field ?x_68 ?x_69 | |
| [class_instances] (20) ?x_69 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (20) ?x_69 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (20) ?x_69 : discrete_field G := @local_ring.residue_field.discrete_field ?x_70 ?x_71 | |
| failed is_def_eq | |
| [class_instances] (20) ?x_69 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (20) ?x_69 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_72 ?x_73 | |
| [class_instances] (21) ?x_73 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (21) ?x_73 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (18) ?x_65 : integral_domain G := @discrete_field.to_integral_domain ?x_66 ?x_67 ?x_68 | |
| [class_instances] (19) ?x_67 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (19) ?x_67 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (19) ?x_67 : discrete_field G := @local_ring.residue_field.discrete_field ?x_69 ?x_70 | |
| failed is_def_eq | |
| [class_instances] (19) ?x_67 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (19) ?x_67 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_71 ?x_72 | |
| [class_instances] (20) ?x_72 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (20) ?x_72 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (18) ?x_65 : integral_domain G := @linear_ordered_comm_ring.to_integral_domain ?x_66 ?x_67 | |
| [class_instances] (19) ?x_67 : linear_ordered_comm_ring G := real.linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (19) ?x_67 : linear_ordered_comm_ring G := rat.linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (19) ?x_67 : linear_ordered_comm_ring G := @decidable_linear_ordered_comm_ring.to_linear_ordered_comm_ring ?x_68 ?x_69 | |
| [class_instances] (20) ?x_69 : decidable_linear_ordered_comm_ring G := real.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (20) ?x_69 : decidable_linear_ordered_comm_ring G := rat.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (20) ?x_69 : decidable_linear_ordered_comm_ring G := int.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (20) ?x_69 : decidable_linear_ordered_comm_ring G := @discrete_linear_ordered_field.to_decidable_linear_ordered_comm_ring ?x_70 ?x_71 | |
| [class_instances] (21) ?x_71 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (21) ?x_71 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (20) ?x_69 : decidable_linear_ordered_comm_ring G := @linear_nonneg_ring.to_decidable_linear_ordered_comm_ring ?x_70 ?x_71 ?x_72 ?x_73 | |
| [class_instances] (16) ?x_61 : _root_.reversible G := @ @_root_.reversible_of_reduced ?x_62 ?x_63 | |
| [class_instances] (16) ?x_61 : _root_.reversible G := @ @_root_.reversible_of_domain ?x_62 ?x_63 | |
| [class_instances] (17) ?x_63 : domain G := real.domain | |
| failed is_def_eq | |
| [class_instances] (17) ?x_63 : domain G := @division_ring.to_domain ?x_64 ?x_65 | |
| [class_instances] (18) ?x_65 : division_ring G := real.division_ring | |
| failed is_def_eq | |
| [class_instances] (18) ?x_65 : division_ring G := rat.division_ring | |
| failed is_def_eq | |
| [class_instances] (18) ?x_65 : division_ring G := @field.to_division_ring ?x_66 ?x_67 | |
| [class_instances] (19) ?x_67 : field G := real.field | |
| failed is_def_eq | |
| [class_instances] (19) ?x_67 : field G := rat.field | |
| failed is_def_eq | |
| [class_instances] (19) ?x_67 : field G := @linear_ordered_field.to_field ?x_68 ?x_69 | |
| [class_instances] (20) ?x_69 : linear_ordered_field G := real.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (20) ?x_69 : linear_ordered_field G := rat.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (20) ?x_69 : linear_ordered_field G := @discrete_linear_ordered_field.to_linear_ordered_field ?x_70 ?x_71 | |
| [class_instances] (21) ?x_71 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (21) ?x_71 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (19) ?x_67 : field G := @discrete_field.to_field ?x_68 ?x_69 | |
| [class_instances] (20) ?x_69 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (20) ?x_69 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (20) ?x_69 : discrete_field G := @local_ring.residue_field.discrete_field ?x_70 ?x_71 | |
| failed is_def_eq | |
| [class_instances] (20) ?x_69 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (20) ?x_69 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_72 ?x_73 | |
| [class_instances] (21) ?x_73 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (21) ?x_73 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (17) ?x_63 : domain G := @linear_nonneg_ring.to_domain ?x_64 ?x_65 | |
| [class_instances] (17) ?x_63 : domain G := @linear_ordered_ring.to_domain ?x_64 ?x_65 | |
| [class_instances] (18) ?x_65 : linear_ordered_ring G := real.linear_ordered_ring | |
| failed is_def_eq | |
| [class_instances] (18) ?x_65 : linear_ordered_ring G := rat.linear_ordered_ring | |
| failed is_def_eq | |
| [class_instances] (18) ?x_65 : linear_ordered_ring G := @linear_ordered_field.to_linear_ordered_ring ?x_66 ?x_67 | |
| [class_instances] (19) ?x_67 : linear_ordered_field G := real.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (19) ?x_67 : linear_ordered_field G := rat.linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (19) ?x_67 : linear_ordered_field G := @discrete_linear_ordered_field.to_linear_ordered_field ?x_68 ?x_69 | |
| [class_instances] (20) ?x_69 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (20) ?x_69 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (18) ?x_65 : linear_ordered_ring G := @linear_nonneg_ring.to_linear_ordered_ring ?x_66 ?x_67 | |
| [class_instances] (18) ?x_65 : linear_ordered_ring G := @linear_ordered_comm_ring.to_linear_ordered_ring ?x_66 ?x_67 | |
| [class_instances] (19) ?x_67 : linear_ordered_comm_ring G := real.linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (19) ?x_67 : linear_ordered_comm_ring G := rat.linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (19) ?x_67 : linear_ordered_comm_ring G := @decidable_linear_ordered_comm_ring.to_linear_ordered_comm_ring ?x_68 ?x_69 | |
| [class_instances] (20) ?x_69 : decidable_linear_ordered_comm_ring G := real.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (20) ?x_69 : decidable_linear_ordered_comm_ring G := rat.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (20) ?x_69 : decidable_linear_ordered_comm_ring G := int.decidable_linear_ordered_comm_ring | |
| failed is_def_eq | |
| [class_instances] (20) ?x_69 : decidable_linear_ordered_comm_ring G := @discrete_linear_ordered_field.to_decidable_linear_ordered_comm_ring ?x_70 ?x_71 | |
| [class_instances] (21) ?x_71 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (21) ?x_71 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (20) ?x_69 : decidable_linear_ordered_comm_ring G := @linear_nonneg_ring.to_decidable_linear_ordered_comm_ring ?x_70 ?x_71 ?x_72 ?x_73 | |
| [class_instances] (17) ?x_63 : domain G := @integral_domain.to_domain ?x_64 ?x_65 | |
| [class_instances] (18) ?x_65 : integral_domain G := real.integral_domain | |
| failed is_def_eq | |
| [class_instances] (18) ?x_65 : integral_domain G := @polynomial.integral_domain ?x_66 ?x_67 | |
| failed is_def_eq | |
| [class_instances] (18) ?x_65 : integral_domain G := @ideal.quotient.integral_domain ?x_68 ?x_69 ?x_70 ?x_71 | |
| failed is_def_eq | |
| [class_instances] (18) ?x_65 : integral_domain G := @subring.domain ?x_72 ?x_73 ?x_74 ?x_75 | |
| failed is_def_eq | |
| [class_instances] (18) ?x_65 : integral_domain G := rat.integral_domain | |
| failed is_def_eq | |
| [class_instances] (18) ?x_65 : integral_domain G := @principal_ideal_domain.to_integral_domain ?x_76 ?x_77 | |
| [class_instances] (19) ?x_77 : principal_ideal_domain G := @euclidean_domain.to_principal_ideal_domain ?x_78 ?x_79 | |
| [class_instances] (20) ?x_79 : euclidean_domain G := @polynomial.euclidean_domain ?x_80 ?x_81 | |
| failed is_def_eq | |
| [class_instances] (20) ?x_79 : euclidean_domain G := int.euclidean_domain | |
| failed is_def_eq | |
| [class_instances] (20) ?x_79 : euclidean_domain G := @discrete_field.to_euclidean_domain ?x_82 ?x_83 | |
| [class_instances] (21) ?x_83 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (21) ?x_83 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (21) ?x_83 : discrete_field G := @local_ring.residue_field.discrete_field ?x_84 ?x_85 | |
| failed is_def_eq | |
| [class_instances] (21) ?x_83 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (21) ?x_83 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_86 ?x_87 | |
| [class_instances] (22) ?x_87 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (22) ?x_87 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (18) ?x_65 : integral_domain G := @euclidean_domain.integral_domain ?x_66 ?x_67 | |
| [class_instances] (19) ?x_67 : euclidean_domain G := @polynomial.euclidean_domain ?x_68 ?x_69 | |
| failed is_def_eq | |
| [class_instances] (19) ?x_67 : euclidean_domain G := int.euclidean_domain | |
| failed is_def_eq | |
| [class_instances] (19) ?x_67 : euclidean_domain G := @discrete_field.to_euclidean_domain ?x_70 ?x_71 | |
| [class_instances] (20) ?x_71 : discrete_field G := complex.discrete_field | |
| failed is_def_eq | |
| [class_instances] (20) ?x_71 : discrete_field G := real.discrete_field | |
| failed is_def_eq | |
| [class_instances] (20) ?x_71 : discrete_field G := @local_ring.residue_field.discrete_field ?x_72 ?x_73 | |
| failed is_def_eq | |
| [class_instances] (20) ?x_71 : discrete_field G := rat.discrete_field | |
| failed is_def_eq | |
| [class_instances] (20) ?x_71 : discrete_field G := @discrete_linear_ordered_field.to_discrete_field ?x_74 ?x_75 | |
| [class_instances] (21) ?x_75 : discrete_linear_ordered_field G := real.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (21) ?x_75 : discrete_linear_ordered_field G := rat.discrete_linear_ordered_field | |
| failed is_def_eq | |
| [class_instances] (18) ?x_65 : integral_domain G := @normalization_domain.to_integral_domain ?x_66 ?x_67 | |
| [class_instances] (19) ?x_67 : normalization_domain G := @polynomial.normalization_domain ?x_68 ?x_69 | |
| failed is_def_eq | |
| [class_instances] (19) ?x_67 : normalization_domain G := int.normalization_domain | |
| failed is_def_eq | |
| [class_instances] (19) ?x_67 : normalization_domain G := @gcd_domain.to_normalization_domain ?x_70 ?x_71 | |
| [class_instances] (20) ?x_71 : gcd_domain G := int.gcd_domain | |
| failed is_def_eq | |
| [class_instances] (18) ?x_65 : integral_domain G := @field.to_integral_domain ?x_66 ?x_67 | |
| [class_instances] (19) ?x_67 : field G := real.field | |
| failed is_def_eq | |
| [class_instances] (19) ?x_67 : field G := rat.field | |
| failed is_def_eq | |
| [class_instances] (19) ?x_67 : field G := @linear_ordered_field.to_field ?x_68 ?x_69 | |
| [class_instances] (20) ?x_69 : linear_ordered_field G := real.linear_ordered_field | |
| fai | |
| (message too long, truncated at 262144 characters) |
Sign up for free
to join this conversation on GitHub.
Already have an account?
Sign in to comment