Created
December 4, 2019 16:41
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Typeclass resolution going out of control
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[class_instances] class-instance resolution trace | |
[class_instances] (0) ?x_0 : has_scalar k V := @continuous_linear_map.has_scalar ?x_1 ?x_2 ?x_3 ?x_4 ?x_5 ?x_6 ?x_7 ?x_8 ?x_9 ?x_10 ?x_11 ?x_12 | |
failed is_def_eq | |
[class_instances] (0) ?x_0 : has_scalar k V := complex.has_scalar | |
failed is_def_eq | |
[class_instances] (0) ?x_0 : has_scalar k V := @algebra.comap.has_scalar ?x_13 ?x_14 ?x_15 ?x_16 ?x_17 ?x_18 ?x_19 ?x_20 | |
failed is_def_eq | |
[class_instances] (0) ?x_0 : has_scalar k V := @algebra.has_scalar ?x_21 ?x_22 ?x_23 ?x_24 ?x_25 | |
[class_instances] (1) ?x_23 : comm_ring k := @subalgebra.comm_ring ?x_26 ?x_27 ?x_28 ?x_29 ?x_30 ?x_31 | |
failed is_def_eq | |
[class_instances] (1) ?x_23 : comm_ring k := @algebra.comap.comm_ring ?x_32 ?x_33 ?x_34 ?x_35 ?x_36 ?x_37 ?x_38 ?x_39 | |
failed is_def_eq | |
[class_instances] (1) ?x_23 : comm_ring k := @free_abelian_group.comm_ring ?x_40 ?x_41 | |
failed is_def_eq | |
[class_instances] (1) ?x_23 : comm_ring k := @mv_polynomial.comm_ring ?x_42 ?x_43 ?x_44 | |
failed is_def_eq | |
[class_instances] (1) ?x_23 : comm_ring k := @polynomial.comm_ring ?x_45 ?x_46 | |
failed is_def_eq | |
[class_instances] (1) ?x_23 : comm_ring k := complex.comm_ring | |
failed is_def_eq | |
[class_instances] (1) ?x_23 : comm_ring k := @ideal.quotient.comm_ring ?x_47 ?x_48 ?x_49 | |
failed is_def_eq | |
[class_instances] (1) ?x_23 : comm_ring k := real.comm_ring | |
failed is_def_eq | |
[class_instances] (1) ?x_23 : comm_ring k := @cau_seq.completion.comm_ring ?x_50 ?x_51 ?x_52 ?x_53 ?x_54 ?x_55 | |
failed is_def_eq | |
[class_instances] (1) ?x_23 : comm_ring k := @cau_seq.comm_ring ?x_56 ?x_57 ?x_58 ?x_59 ?x_60 ?x_61 | |
failed is_def_eq | |
[class_instances] (1) ?x_23 : comm_ring k := @finsupp.comm_ring ?x_62 ?x_63 ?x_64 ?x_65 | |
failed is_def_eq | |
[class_instances] (1) ?x_23 : comm_ring k := @prod.comm_ring ?x_66 ?x_67 ?x_68 ?x_69 | |
failed is_def_eq | |
[class_instances] (1) ?x_23 : comm_ring k := @pi.comm_ring ?x_70 ?x_71 ?x_72 | |
failed is_def_eq | |
[class_instances] (1) ?x_23 : comm_ring k := @subtype.comm_ring ?x_73 ?x_74 ?x_75 ?x_76 | |
failed is_def_eq | |
[class_instances] (1) ?x_23 : comm_ring k := @subset.comm_ring ?x_77 ?x_78 ?x_79 ?x_80 | |
failed is_def_eq | |
[class_instances] (1) ?x_23 : comm_ring k := rat.comm_ring | |
failed is_def_eq | |
[class_instances] (1) ?x_23 : comm_ring k := int.comm_ring | |
failed is_def_eq | |
[class_instances] (1) ?x_23 : comm_ring k := @nonzero_comm_ring.to_comm_ring ?x_81 ?x_82 | |
[class_instances] (2) ?x_82 : nonzero_comm_ring k := @polynomial.nonzero_comm_ring ?x_83 ?x_84 | |
failed is_def_eq | |
[class_instances] (2) ?x_82 : nonzero_comm_ring k := real.nonzero_comm_ring | |
failed is_def_eq | |
[class_instances] (2) ?x_82 : nonzero_comm_ring k := @prod.nonzero_comm_ring ?x_85 ?x_86 ?x_87 ?x_88 | |
failed is_def_eq | |
[class_instances] (2) ?x_82 : nonzero_comm_ring k := rat.nonzero_comm_ring | |
failed is_def_eq | |
[class_instances] (2) ?x_82 : nonzero_comm_ring k := @euclidean_domain.to_nonzero_comm_ring ?x_89 ?x_90 | |
[class_instances] (3) ?x_90 : euclidean_domain k := @polynomial.euclidean_domain ?x_91 ?x_92 | |
failed is_def_eq | |
[class_instances] (3) ?x_90 : euclidean_domain k := int.euclidean_domain | |
failed is_def_eq | |
[class_instances] (3) ?x_90 : euclidean_domain k := @discrete_field.to_euclidean_domain ?x_93 ?x_94 | |
[class_instances] (4) ?x_94 : discrete_field k := complex.discrete_field | |
failed is_def_eq | |
[class_instances] (4) ?x_94 : discrete_field k := @local_ring.residue_field.discrete_field ?x_95 ?x_96 | |
failed is_def_eq | |
[class_instances] (4) ?x_94 : discrete_field k := real.discrete_field | |
failed is_def_eq | |
[class_instances] (4) ?x_94 : discrete_field k := rat.discrete_field | |
failed is_def_eq | |
[class_instances] (4) ?x_94 : discrete_field k := @discrete_linear_ordered_field.to_discrete_field ?x_97 ?x_98 | |
[class_instances] (5) ?x_98 : discrete_linear_ordered_field k := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_98 : discrete_linear_ordered_field k := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (4) ?x_94 : discrete_field k := @normed_field.to_discrete_field ?x_95 ?x_96 | |
[class_instances] (5) ?x_96 : normed_field k := _inst_1 | |
[class_instances] (1) ?x_24 : ring V := @continuous_linear_map.ring ?x_97 ?x_98 ?x_99 ?x_100 ?x_101 ?x_102 ?x_103 | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := @subalgebra.ring ?x_104 ?x_105 ?x_106 ?x_107 ?x_108 ?x_109 | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := @algebra.comap.ring ?x_110 ?x_111 ?x_112 ?x_113 ?x_114 ?x_115 ?x_116 ?x_117 | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := @free_abelian_group.ring ?x_118 ?x_119 | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := @matrix.ring ?x_120 ?x_121 ?x_122 ?x_123 ?x_124 | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := @mv_polynomial.ring ?x_125 ?x_126 ?x_127 | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := real.ring | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := @cau_seq.ring ?x_128 ?x_129 ?x_130 ?x_131 ?x_132 ?x_133 | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := @linear_map.endomorphism_ring ?x_134 ?x_135 ?x_136 ?x_137 ?x_138 | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := @finsupp.ring ?x_139 ?x_140 ?x_141 ?x_142 | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := @prod.ring ?x_143 ?x_144 ?x_145 ?x_146 | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := @pi.ring ?x_147 ?x_148 ?x_149 | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := @subtype.ring ?x_150 ?x_151 ?x_152 ?x_153 | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := @subset.ring ?x_154 ?x_155 ?x_156 ?x_157 | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := int.ring | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := @normed_ring.to_ring ?x_158 ?x_159 | |
[class_instances] (2) ?x_159 : normed_ring V := int.normed_ring | |
failed is_def_eq | |
[class_instances] (2) ?x_159 : normed_ring V := @prod.normed_ring ?x_160 ?x_161 ?x_162 ?x_163 | |
failed is_def_eq | |
[class_instances] (2) ?x_159 : normed_ring V := @normed_field.to_normed_ring ?x_164 ?x_165 | |
[class_instances] (3) ?x_165 : normed_field V := _inst_1 | |
failed is_def_eq | |
[class_instances] (3) ?x_165 : normed_field V := rat.normed_field | |
failed is_def_eq | |
[class_instances] (3) ?x_165 : normed_field V := normed_field.normed_field | |
failed is_def_eq | |
[class_instances] (3) ?x_165 : normed_field V := @nondiscrete_normed_field.to_normed_field ?x_166 ?x_167 | |
[class_instances] (4) ?x_167 : nondiscrete_normed_field V := rat.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (4) ?x_167 : nondiscrete_normed_field V := normed_field.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := @nonneg_ring.to_ring ?x_97 ?x_98 | |
[class_instances] (2) ?x_98 : nonneg_ring V := @linear_nonneg_ring.to_nonneg_ring ?x_99 ?x_100 | |
[class_instances] (1) ?x_24 : ring V := @domain.to_ring ?x_97 ?x_98 | |
[class_instances] (2) ?x_98 : domain V := real.domain | |
failed is_def_eq | |
[class_instances] (2) ?x_98 : domain V := @division_ring.to_domain ?x_99 ?x_100 | |
[class_instances] (3) ?x_100 : division_ring V := real.division_ring | |
failed is_def_eq | |
[class_instances] (3) ?x_100 : division_ring V := rat.division_ring | |
failed is_def_eq | |
[class_instances] (3) ?x_100 : division_ring V := @field.to_division_ring ?x_101 ?x_102 | |
[class_instances] (4) ?x_102 : field V := real.field | |
failed is_def_eq | |
[class_instances] (4) ?x_102 : field V := rat.field | |
failed is_def_eq | |
[class_instances] (4) ?x_102 : field V := @linear_ordered_field.to_field ?x_103 ?x_104 | |
[class_instances] (5) ?x_104 : linear_ordered_field V := real.linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_104 : linear_ordered_field V := rat.linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_104 : linear_ordered_field V := @discrete_linear_ordered_field.to_linear_ordered_field ?x_105 ?x_106 | |
[class_instances] (6) ?x_106 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_106 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (4) ?x_102 : field V := @discrete_field.to_field ?x_103 ?x_104 | |
[class_instances] (5) ?x_104 : discrete_field V := complex.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_104 : discrete_field V := @local_ring.residue_field.discrete_field ?x_105 ?x_106 | |
failed is_def_eq | |
[class_instances] (5) ?x_104 : discrete_field V := real.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_104 : discrete_field V := rat.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_104 : discrete_field V := @discrete_linear_ordered_field.to_discrete_field ?x_107 ?x_108 | |
[class_instances] (6) ?x_108 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_108 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_104 : discrete_field V := @normed_field.to_discrete_field ?x_105 ?x_106 | |
[class_instances] (6) ?x_106 : normed_field V := _inst_1 | |
failed is_def_eq | |
[class_instances] (6) ?x_106 : normed_field V := rat.normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_106 : normed_field V := normed_field.normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_106 : normed_field V := @nondiscrete_normed_field.to_normed_field ?x_107 ?x_108 | |
[class_instances] (7) ?x_108 : nondiscrete_normed_field V := rat.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (7) ?x_108 : nondiscrete_normed_field V := normed_field.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (2) ?x_98 : domain V := @linear_nonneg_ring.to_domain ?x_99 ?x_100 | |
[class_instances] (2) ?x_98 : domain V := @linear_ordered_ring.to_domain ?x_99 ?x_100 | |
[class_instances] (3) ?x_100 : linear_ordered_ring V := real.linear_ordered_ring | |
failed is_def_eq | |
[class_instances] (3) ?x_100 : linear_ordered_ring V := rat.linear_ordered_ring | |
failed is_def_eq | |
[class_instances] (3) ?x_100 : linear_ordered_ring V := @linear_ordered_field.to_linear_ordered_ring ?x_101 ?x_102 | |
[class_instances] (4) ?x_102 : linear_ordered_field V := real.linear_ordered_field | |
failed is_def_eq | |
[class_instances] (4) ?x_102 : linear_ordered_field V := rat.linear_ordered_field | |
failed is_def_eq | |
[class_instances] (4) ?x_102 : linear_ordered_field V := @discrete_linear_ordered_field.to_linear_ordered_field ?x_103 ?x_104 | |
[class_instances] (5) ?x_104 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_104 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (3) ?x_100 : linear_ordered_ring V := @linear_nonneg_ring.to_linear_ordered_ring ?x_101 ?x_102 | |
[class_instances] (3) ?x_100 : linear_ordered_ring V := @linear_ordered_comm_ring.to_linear_ordered_ring ?x_101 ?x_102 | |
[class_instances] (4) ?x_102 : linear_ordered_comm_ring V := real.linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (4) ?x_102 : linear_ordered_comm_ring V := rat.linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (4) ?x_102 : linear_ordered_comm_ring V := @decidable_linear_ordered_comm_ring.to_linear_ordered_comm_ring ?x_103 ?x_104 | |
[class_instances] (5) ?x_104 : decidable_linear_ordered_comm_ring V := real.decidable_linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (5) ?x_104 : decidable_linear_ordered_comm_ring V := rat.decidable_linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (5) ?x_104 : decidable_linear_ordered_comm_ring V := int.decidable_linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (5) ?x_104 : decidable_linear_ordered_comm_ring V := @discrete_linear_ordered_field.to_decidable_linear_ordered_comm_ring ?x_105 ?x_106 | |
[class_instances] (6) ?x_106 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_106 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_104 : decidable_linear_ordered_comm_ring V := @linear_nonneg_ring.to_decidable_linear_ordered_comm_ring ?x_105 ?x_106 ?x_107 ?x_108 | |
[class_instances] (2) ?x_98 : domain V := @integral_domain.to_domain ?x_99 ?x_100 | |
[class_instances] (3) ?x_100 : integral_domain V := @polynomial.integral_domain ?x_101 ?x_102 | |
failed is_def_eq | |
[class_instances] (3) ?x_100 : integral_domain V := @ideal.quotient.integral_domain ?x_103 ?x_104 ?x_105 ?x_106 | |
failed is_def_eq | |
[class_instances] (3) ?x_100 : integral_domain V := real.integral_domain | |
failed is_def_eq | |
[class_instances] (3) ?x_100 : integral_domain V := @subring.domain ?x_107 ?x_108 ?x_109 ?x_110 | |
failed is_def_eq | |
[class_instances] (3) ?x_100 : integral_domain V := rat.integral_domain | |
failed is_def_eq | |
[class_instances] (3) ?x_100 : integral_domain V := @euclidean_domain.integral_domain ?x_111 ?x_112 | |
[class_instances] (4) ?x_112 : euclidean_domain V := @polynomial.euclidean_domain ?x_113 ?x_114 | |
failed is_def_eq | |
[class_instances] (4) ?x_112 : euclidean_domain V := int.euclidean_domain | |
failed is_def_eq | |
[class_instances] (4) ?x_112 : euclidean_domain V := @discrete_field.to_euclidean_domain ?x_115 ?x_116 | |
[class_instances] (5) ?x_116 : discrete_field V := complex.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_116 : discrete_field V := @local_ring.residue_field.discrete_field ?x_117 ?x_118 | |
failed is_def_eq | |
[class_instances] (5) ?x_116 : discrete_field V := real.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_116 : discrete_field V := rat.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_116 : discrete_field V := @discrete_linear_ordered_field.to_discrete_field ?x_119 ?x_120 | |
[class_instances] (6) ?x_120 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_120 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_116 : discrete_field V := @normed_field.to_discrete_field ?x_117 ?x_118 | |
[class_instances] (6) ?x_118 : normed_field V := _inst_1 | |
failed is_def_eq | |
[class_instances] (6) ?x_118 : normed_field V := rat.normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_118 : normed_field V := normed_field.normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_118 : normed_field V := @nondiscrete_normed_field.to_normed_field ?x_119 ?x_120 | |
[class_instances] (7) ?x_120 : nondiscrete_normed_field V := rat.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (7) ?x_120 : nondiscrete_normed_field V := normed_field.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (3) ?x_100 : integral_domain V := @normalization_domain.to_integral_domain ?x_101 ?x_102 | |
[class_instances] (4) ?x_102 : normalization_domain V := @polynomial.normalization_domain ?x_103 ?x_104 | |
failed is_def_eq | |
[class_instances] (4) ?x_102 : normalization_domain V := int.normalization_domain | |
failed is_def_eq | |
[class_instances] (4) ?x_102 : normalization_domain V := @gcd_domain.to_normalization_domain ?x_105 ?x_106 | |
[class_instances] (5) ?x_106 : gcd_domain V := int.gcd_domain | |
failed is_def_eq | |
[class_instances] (3) ?x_100 : integral_domain V := @field.to_integral_domain ?x_101 ?x_102 | |
[class_instances] (4) ?x_102 : field V := real.field | |
failed is_def_eq | |
[class_instances] (4) ?x_102 : field V := rat.field | |
failed is_def_eq | |
[class_instances] (4) ?x_102 : field V := @linear_ordered_field.to_field ?x_103 ?x_104 | |
[class_instances] (5) ?x_104 : linear_ordered_field V := real.linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_104 : linear_ordered_field V := rat.linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_104 : linear_ordered_field V := @discrete_linear_ordered_field.to_linear_ordered_field ?x_105 ?x_106 | |
[class_instances] (6) ?x_106 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_106 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (4) ?x_102 : field V := @discrete_field.to_field ?x_103 ?x_104 | |
[class_instances] (5) ?x_104 : discrete_field V := complex.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_104 : discrete_field V := @local_ring.residue_field.discrete_field ?x_105 ?x_106 | |
failed is_def_eq | |
[class_instances] (5) ?x_104 : discrete_field V := real.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_104 : discrete_field V := rat.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_104 : discrete_field V := @discrete_linear_ordered_field.to_discrete_field ?x_107 ?x_108 | |
[class_instances] (6) ?x_108 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_108 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_104 : discrete_field V := @normed_field.to_discrete_field ?x_105 ?x_106 | |
[class_instances] (6) ?x_106 : normed_field V := _inst_1 | |
failed is_def_eq | |
[class_instances] (6) ?x_106 : normed_field V := rat.normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_106 : normed_field V := normed_field.normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_106 : normed_field V := @nondiscrete_normed_field.to_normed_field ?x_107 ?x_108 | |
[class_instances] (7) ?x_108 : nondiscrete_normed_field V := rat.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (7) ?x_108 : nondiscrete_normed_field V := normed_field.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (3) ?x_100 : integral_domain V := @discrete_field.to_integral_domain ?x_101 ?x_102 ?x_103 | |
[class_instances] (4) ?x_102 : discrete_field V := complex.discrete_field | |
failed is_def_eq | |
[class_instances] (4) ?x_102 : discrete_field V := @local_ring.residue_field.discrete_field ?x_104 ?x_105 | |
failed is_def_eq | |
[class_instances] (4) ?x_102 : discrete_field V := real.discrete_field | |
failed is_def_eq | |
[class_instances] (4) ?x_102 : discrete_field V := rat.discrete_field | |
failed is_def_eq | |
[class_instances] (4) ?x_102 : discrete_field V := @discrete_linear_ordered_field.to_discrete_field ?x_106 ?x_107 | |
[class_instances] (5) ?x_107 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_107 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (4) ?x_102 : discrete_field V := @normed_field.to_discrete_field ?x_104 ?x_105 | |
[class_instances] (5) ?x_105 : normed_field V := _inst_1 | |
failed is_def_eq | |
[class_instances] (5) ?x_105 : normed_field V := rat.normed_field | |
failed is_def_eq | |
[class_instances] (5) ?x_105 : normed_field V := normed_field.normed_field | |
failed is_def_eq | |
[class_instances] (5) ?x_105 : normed_field V := @nondiscrete_normed_field.to_normed_field ?x_106 ?x_107 | |
[class_instances] (6) ?x_107 : nondiscrete_normed_field V := rat.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_107 : nondiscrete_normed_field V := normed_field.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (3) ?x_100 : integral_domain V := @linear_ordered_comm_ring.to_integral_domain ?x_101 ?x_102 | |
[class_instances] (4) ?x_102 : linear_ordered_comm_ring V := real.linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (4) ?x_102 : linear_ordered_comm_ring V := rat.linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (4) ?x_102 : linear_ordered_comm_ring V := @decidable_linear_ordered_comm_ring.to_linear_ordered_comm_ring ?x_103 ?x_104 | |
[class_instances] (5) ?x_104 : decidable_linear_ordered_comm_ring V := real.decidable_linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (5) ?x_104 : decidable_linear_ordered_comm_ring V := rat.decidable_linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (5) ?x_104 : decidable_linear_ordered_comm_ring V := int.decidable_linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (5) ?x_104 : decidable_linear_ordered_comm_ring V := @discrete_linear_ordered_field.to_decidable_linear_ordered_comm_ring ?x_105 ?x_106 | |
[class_instances] (6) ?x_106 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_106 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_104 : decidable_linear_ordered_comm_ring V := @linear_nonneg_ring.to_decidable_linear_ordered_comm_ring ?x_105 ?x_106 ?x_107 ?x_108 | |
[class_instances] (1) ?x_24 : ring V := @division_ring.to_ring ?x_97 ?x_98 | |
[class_instances] (2) ?x_98 : division_ring V := real.division_ring | |
failed is_def_eq | |
[class_instances] (2) ?x_98 : division_ring V := rat.division_ring | |
failed is_def_eq | |
[class_instances] (2) ?x_98 : division_ring V := @field.to_division_ring ?x_99 ?x_100 | |
[class_instances] (3) ?x_100 : field V := real.field | |
failed is_def_eq | |
[class_instances] (3) ?x_100 : field V := rat.field | |
failed is_def_eq | |
[class_instances] (3) ?x_100 : field V := @linear_ordered_field.to_field ?x_101 ?x_102 | |
[class_instances] (4) ?x_102 : linear_ordered_field V := real.linear_ordered_field | |
failed is_def_eq | |
[class_instances] (4) ?x_102 : linear_ordered_field V := rat.linear_ordered_field | |
failed is_def_eq | |
[class_instances] (4) ?x_102 : linear_ordered_field V := @discrete_linear_ordered_field.to_linear_ordered_field ?x_103 ?x_104 | |
[class_instances] (5) ?x_104 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_104 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (3) ?x_100 : field V := @discrete_field.to_field ?x_101 ?x_102 | |
[class_instances] (4) ?x_102 : discrete_field V := complex.discrete_field | |
failed is_def_eq | |
[class_instances] (4) ?x_102 : discrete_field V := @local_ring.residue_field.discrete_field ?x_103 ?x_104 | |
failed is_def_eq | |
[class_instances] (4) ?x_102 : discrete_field V := real.discrete_field | |
failed is_def_eq | |
[class_instances] (4) ?x_102 : discrete_field V := rat.discrete_field | |
failed is_def_eq | |
[class_instances] (4) ?x_102 : discrete_field V := @discrete_linear_ordered_field.to_discrete_field ?x_105 ?x_106 | |
[class_instances] (5) ?x_106 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_106 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (4) ?x_102 : discrete_field V := @normed_field.to_discrete_field ?x_103 ?x_104 | |
[class_instances] (5) ?x_104 : normed_field V := _inst_1 | |
failed is_def_eq | |
[class_instances] (5) ?x_104 : normed_field V := rat.normed_field | |
failed is_def_eq | |
[class_instances] (5) ?x_104 : normed_field V := normed_field.normed_field | |
failed is_def_eq | |
[class_instances] (5) ?x_104 : normed_field V := @nondiscrete_normed_field.to_normed_field ?x_105 ?x_106 | |
[class_instances] (6) ?x_106 : nondiscrete_normed_field V := rat.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_106 : nondiscrete_normed_field V := normed_field.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := @ordered_ring.to_ring ?x_97 ?x_98 | |
[class_instances] (2) ?x_98 : ordered_ring V := real.ordered_ring | |
failed is_def_eq | |
[class_instances] (2) ?x_98 : ordered_ring V := rat.ordered_ring | |
failed is_def_eq | |
[class_instances] (2) ?x_98 : ordered_ring V := @nonneg_ring.to_ordered_ring ?x_99 ?x_100 | |
[class_instances] (3) ?x_100 : nonneg_ring V := @linear_nonneg_ring.to_nonneg_ring ?x_101 ?x_102 | |
[class_instances] (2) ?x_98 : ordered_ring V := @linear_ordered_ring.to_ordered_ring ?x_99 ?x_100 | |
[class_instances] (3) ?x_100 : linear_ordered_ring V := real.linear_ordered_ring | |
failed is_def_eq | |
[class_instances] (3) ?x_100 : linear_ordered_ring V := rat.linear_ordered_ring | |
failed is_def_eq | |
[class_instances] (3) ?x_100 : linear_ordered_ring V := @linear_ordered_field.to_linear_ordered_ring ?x_101 ?x_102 | |
[class_instances] (4) ?x_102 : linear_ordered_field V := real.linear_ordered_field | |
failed is_def_eq | |
[class_instances] (4) ?x_102 : linear_ordered_field V := rat.linear_ordered_field | |
failed is_def_eq | |
[class_instances] (4) ?x_102 : linear_ordered_field V := @discrete_linear_ordered_field.to_linear_ordered_field ?x_103 ?x_104 | |
[class_instances] (5) ?x_104 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_104 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (3) ?x_100 : linear_ordered_ring V := @linear_nonneg_ring.to_linear_ordered_ring ?x_101 ?x_102 | |
[class_instances] (3) ?x_100 : linear_ordered_ring V := @linear_ordered_comm_ring.to_linear_ordered_ring ?x_101 ?x_102 | |
[class_instances] (4) ?x_102 : linear_ordered_comm_ring V := real.linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (4) ?x_102 : linear_ordered_comm_ring V := rat.linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (4) ?x_102 : linear_ordered_comm_ring V := @decidable_linear_ordered_comm_ring.to_linear_ordered_comm_ring ?x_103 ?x_104 | |
[class_instances] (5) ?x_104 : decidable_linear_ordered_comm_ring V := real.decidable_linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (5) ?x_104 : decidable_linear_ordered_comm_ring V := rat.decidable_linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (5) ?x_104 : decidable_linear_ordered_comm_ring V := int.decidable_linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (5) ?x_104 : decidable_linear_ordered_comm_ring V := @discrete_linear_ordered_field.to_decidable_linear_ordered_comm_ring ?x_105 ?x_106 | |
[class_instances] (6) ?x_106 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_106 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_104 : decidable_linear_ordered_comm_ring V := @linear_nonneg_ring.to_decidable_linear_ordered_comm_ring ?x_105 ?x_106 ?x_107 ?x_108 | |
[class_instances] (1) ?x_24 : ring V := @comm_ring.to_ring ?x_97 ?x_98 | |
[class_instances] (2) ?x_98 : comm_ring V := @subalgebra.comm_ring ?x_99 ?x_100 ?x_101 ?x_102 ?x_103 ?x_104 | |
failed is_def_eq | |
[class_instances] (2) ?x_98 : comm_ring V := @algebra.comap.comm_ring ?x_105 ?x_106 ?x_107 ?x_108 ?x_109 ?x_110 ?x_111 ?x_112 | |
failed is_def_eq | |
[class_instances] (2) ?x_98 : comm_ring V := @free_abelian_group.comm_ring ?x_113 ?x_114 | |
failed is_def_eq | |
[class_instances] (2) ?x_98 : comm_ring V := @mv_polynomial.comm_ring ?x_115 ?x_116 ?x_117 | |
failed is_def_eq | |
[class_instances] (2) ?x_98 : comm_ring V := @polynomial.comm_ring ?x_118 ?x_119 | |
failed is_def_eq | |
[class_instances] (2) ?x_98 : comm_ring V := complex.comm_ring | |
failed is_def_eq | |
[class_instances] (2) ?x_98 : comm_ring V := @ideal.quotient.comm_ring ?x_120 ?x_121 ?x_122 | |
failed is_def_eq | |
[class_instances] (2) ?x_98 : comm_ring V := real.comm_ring | |
failed is_def_eq | |
[class_instances] (2) ?x_98 : comm_ring V := @cau_seq.completion.comm_ring ?x_123 ?x_124 ?x_125 ?x_126 ?x_127 ?x_128 | |
failed is_def_eq | |
[class_instances] (2) ?x_98 : comm_ring V := @cau_seq.comm_ring ?x_129 ?x_130 ?x_131 ?x_132 ?x_133 ?x_134 | |
failed is_def_eq | |
[class_instances] (2) ?x_98 : comm_ring V := @finsupp.comm_ring ?x_135 ?x_136 ?x_137 ?x_138 | |
failed is_def_eq | |
[class_instances] (2) ?x_98 : comm_ring V := @prod.comm_ring ?x_139 ?x_140 ?x_141 ?x_142 | |
failed is_def_eq | |
[class_instances] (2) ?x_98 : comm_ring V := @pi.comm_ring ?x_143 ?x_144 ?x_145 | |
failed is_def_eq | |
[class_instances] (2) ?x_98 : comm_ring V := @subtype.comm_ring ?x_146 ?x_147 ?x_148 ?x_149 | |
failed is_def_eq | |
[class_instances] (2) ?x_98 : comm_ring V := @subset.comm_ring ?x_150 ?x_151 ?x_152 ?x_153 | |
failed is_def_eq | |
[class_instances] (2) ?x_98 : comm_ring V := rat.comm_ring | |
failed is_def_eq | |
[class_instances] (2) ?x_98 : comm_ring V := int.comm_ring | |
failed is_def_eq | |
[class_instances] (2) ?x_98 : comm_ring V := @nonzero_comm_ring.to_comm_ring ?x_154 ?x_155 | |
[class_instances] (3) ?x_155 : nonzero_comm_ring V := @polynomial.nonzero_comm_ring ?x_156 ?x_157 | |
failed is_def_eq | |
[class_instances] (3) ?x_155 : nonzero_comm_ring V := real.nonzero_comm_ring | |
failed is_def_eq | |
[class_instances] (3) ?x_155 : nonzero_comm_ring V := @prod.nonzero_comm_ring ?x_158 ?x_159 ?x_160 ?x_161 | |
failed is_def_eq | |
[class_instances] (3) ?x_155 : nonzero_comm_ring V := rat.nonzero_comm_ring | |
failed is_def_eq | |
[class_instances] (3) ?x_155 : nonzero_comm_ring V := @euclidean_domain.to_nonzero_comm_ring ?x_162 ?x_163 | |
[class_instances] (4) ?x_163 : euclidean_domain V := @polynomial.euclidean_domain ?x_164 ?x_165 | |
failed is_def_eq | |
[class_instances] (4) ?x_163 : euclidean_domain V := int.euclidean_domain | |
failed is_def_eq | |
[class_instances] (4) ?x_163 : euclidean_domain V := @discrete_field.to_euclidean_domain ?x_166 ?x_167 | |
[class_instances] (5) ?x_167 : discrete_field V := complex.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_167 : discrete_field V := @local_ring.residue_field.discrete_field ?x_168 ?x_169 | |
failed is_def_eq | |
[class_instances] (5) ?x_167 : discrete_field V := real.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_167 : discrete_field V := rat.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_167 : discrete_field V := @discrete_linear_ordered_field.to_discrete_field ?x_170 ?x_171 | |
[class_instances] (6) ?x_171 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_171 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_167 : discrete_field V := @normed_field.to_discrete_field ?x_168 ?x_169 | |
[class_instances] (6) ?x_169 : normed_field V := _inst_1 | |
failed is_def_eq | |
[class_instances] (6) ?x_169 : normed_field V := rat.normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_169 : normed_field V := normed_field.normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_169 : normed_field V := @nondiscrete_normed_field.to_normed_field ?x_170 ?x_171 | |
[class_instances] (7) ?x_171 : nondiscrete_normed_field V := rat.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (7) ?x_171 : nondiscrete_normed_field V := normed_field.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (3) ?x_155 : nonzero_comm_ring V := @local_ring.to_nonzero_comm_ring ?x_156 ?x_157 | |
[class_instances] (4) ?x_157 : local_ring V := @discrete_field.local_ring ?x_158 ?x_159 | |
[class_instances] (5) ?x_159 : discrete_field V := complex.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_159 : discrete_field V := @local_ring.residue_field.discrete_field ?x_160 ?x_161 | |
failed is_def_eq | |
[class_instances] (5) ?x_159 : discrete_field V := real.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_159 : discrete_field V := rat.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_159 : discrete_field V := @discrete_linear_ordered_field.to_discrete_field ?x_162 ?x_163 | |
[class_instances] (6) ?x_163 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_163 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_159 : discrete_field V := @normed_field.to_discrete_field ?x_160 ?x_161 | |
[class_instances] (6) ?x_161 : normed_field V := _inst_1 | |
failed is_def_eq | |
[class_instances] (6) ?x_161 : normed_field V := rat.normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_161 : normed_field V := normed_field.normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_161 : normed_field V := @nondiscrete_normed_field.to_normed_field ?x_162 ?x_163 | |
[class_instances] (7) ?x_163 : nondiscrete_normed_field V := rat.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (7) ?x_163 : nondiscrete_normed_field V := normed_field.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (3) ?x_155 : nonzero_comm_ring V := @integral_domain.to_nonzero_comm_ring ?x_156 ?x_157 | |
[class_instances] (4) ?x_157 : integral_domain V := @polynomial.integral_domain ?x_158 ?x_159 | |
failed is_def_eq | |
[class_instances] (4) ?x_157 : integral_domain V := @ideal.quotient.integral_domain ?x_160 ?x_161 ?x_162 ?x_163 | |
failed is_def_eq | |
[class_instances] (4) ?x_157 : integral_domain V := real.integral_domain | |
failed is_def_eq | |
[class_instances] (4) ?x_157 : integral_domain V := @subring.domain ?x_164 ?x_165 ?x_166 ?x_167 | |
failed is_def_eq | |
[class_instances] (4) ?x_157 : integral_domain V := rat.integral_domain | |
failed is_def_eq | |
[class_instances] (4) ?x_157 : integral_domain V := @euclidean_domain.integral_domain ?x_168 ?x_169 | |
[class_instances] (5) ?x_169 : euclidean_domain V := @polynomial.euclidean_domain ?x_170 ?x_171 | |
failed is_def_eq | |
[class_instances] (5) ?x_169 : euclidean_domain V := int.euclidean_domain | |
failed is_def_eq | |
[class_instances] (5) ?x_169 : euclidean_domain V := @discrete_field.to_euclidean_domain ?x_172 ?x_173 | |
[class_instances] (6) ?x_173 : discrete_field V := complex.discrete_field | |
failed is_def_eq | |
[class_instances] (6) ?x_173 : discrete_field V := @local_ring.residue_field.discrete_field ?x_174 ?x_175 | |
failed is_def_eq | |
[class_instances] (6) ?x_173 : discrete_field V := real.discrete_field | |
failed is_def_eq | |
[class_instances] (6) ?x_173 : discrete_field V := rat.discrete_field | |
failed is_def_eq | |
[class_instances] (6) ?x_173 : discrete_field V := @discrete_linear_ordered_field.to_discrete_field ?x_176 ?x_177 | |
[class_instances] (7) ?x_177 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (7) ?x_177 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_173 : discrete_field V := @normed_field.to_discrete_field ?x_174 ?x_175 | |
[class_instances] (7) ?x_175 : normed_field V := _inst_1 | |
failed is_def_eq | |
[class_instances] (7) ?x_175 : normed_field V := rat.normed_field | |
failed is_def_eq | |
[class_instances] (7) ?x_175 : normed_field V := normed_field.normed_field | |
failed is_def_eq | |
[class_instances] (7) ?x_175 : normed_field V := @nondiscrete_normed_field.to_normed_field ?x_176 ?x_177 | |
[class_instances] (8) ?x_177 : nondiscrete_normed_field V := rat.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (8) ?x_177 : nondiscrete_normed_field V := normed_field.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (4) ?x_157 : integral_domain V := @normalization_domain.to_integral_domain ?x_158 ?x_159 | |
[class_instances] (5) ?x_159 : normalization_domain V := @polynomial.normalization_domain ?x_160 ?x_161 | |
failed is_def_eq | |
[class_instances] (5) ?x_159 : normalization_domain V := int.normalization_domain | |
failed is_def_eq | |
[class_instances] (5) ?x_159 : normalization_domain V := @gcd_domain.to_normalization_domain ?x_162 ?x_163 | |
[class_instances] (6) ?x_163 : gcd_domain V := int.gcd_domain | |
failed is_def_eq | |
[class_instances] (4) ?x_157 : integral_domain V := @field.to_integral_domain ?x_158 ?x_159 | |
[class_instances] (5) ?x_159 : field V := real.field | |
failed is_def_eq | |
[class_instances] (5) ?x_159 : field V := rat.field | |
failed is_def_eq | |
[class_instances] (5) ?x_159 : field V := @linear_ordered_field.to_field ?x_160 ?x_161 | |
[class_instances] (6) ?x_161 : linear_ordered_field V := real.linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_161 : linear_ordered_field V := rat.linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_161 : linear_ordered_field V := @discrete_linear_ordered_field.to_linear_ordered_field ?x_162 ?x_163 | |
[class_instances] (7) ?x_163 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (7) ?x_163 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_159 : field V := @discrete_field.to_field ?x_160 ?x_161 | |
[class_instances] (6) ?x_161 : discrete_field V := complex.discrete_field | |
failed is_def_eq | |
[class_instances] (6) ?x_161 : discrete_field V := @local_ring.residue_field.discrete_field ?x_162 ?x_163 | |
failed is_def_eq | |
[class_instances] (6) ?x_161 : discrete_field V := real.discrete_field | |
failed is_def_eq | |
[class_instances] (6) ?x_161 : discrete_field V := rat.discrete_field | |
failed is_def_eq | |
[class_instances] (6) ?x_161 : discrete_field V := @discrete_linear_ordered_field.to_discrete_field ?x_164 ?x_165 | |
[class_instances] (7) ?x_165 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (7) ?x_165 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_161 : discrete_field V := @normed_field.to_discrete_field ?x_162 ?x_163 | |
[class_instances] (7) ?x_163 : normed_field V := _inst_1 | |
failed is_def_eq | |
[class_instances] (7) ?x_163 : normed_field V := rat.normed_field | |
failed is_def_eq | |
[class_instances] (7) ?x_163 : normed_field V := normed_field.normed_field | |
failed is_def_eq | |
[class_instances] (7) ?x_163 : normed_field V := @nondiscrete_normed_field.to_normed_field ?x_164 ?x_165 | |
[class_instances] (8) ?x_165 : nondiscrete_normed_field V := rat.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (8) ?x_165 : nondiscrete_normed_field V := normed_field.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (4) ?x_157 : integral_domain V := @discrete_field.to_integral_domain ?x_158 ?x_159 ?x_160 | |
[class_instances] (5) ?x_159 : discrete_field V := complex.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_159 : discrete_field V := @local_ring.residue_field.discrete_field ?x_161 ?x_162 | |
failed is_def_eq | |
[class_instances] (5) ?x_159 : discrete_field V := real.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_159 : discrete_field V := rat.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_159 : discrete_field V := @discrete_linear_ordered_field.to_discrete_field ?x_163 ?x_164 | |
[class_instances] (6) ?x_164 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_164 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_159 : discrete_field V := @normed_field.to_discrete_field ?x_161 ?x_162 | |
[class_instances] (6) ?x_162 : normed_field V := _inst_1 | |
failed is_def_eq | |
[class_instances] (6) ?x_162 : normed_field V := rat.normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_162 : normed_field V := normed_field.normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_162 : normed_field V := @nondiscrete_normed_field.to_normed_field ?x_163 ?x_164 | |
[class_instances] (7) ?x_164 : nondiscrete_normed_field V := rat.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (7) ?x_164 : nondiscrete_normed_field V := normed_field.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (4) ?x_157 : integral_domain V := @linear_ordered_comm_ring.to_integral_domain ?x_158 ?x_159 | |
[class_instances] (5) ?x_159 : linear_ordered_comm_ring V := real.linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (5) ?x_159 : linear_ordered_comm_ring V := rat.linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (5) ?x_159 : linear_ordered_comm_ring V := @decidable_linear_ordered_comm_ring.to_linear_ordered_comm_ring ?x_160 ?x_161 | |
[class_instances] (6) ?x_161 : decidable_linear_ordered_comm_ring V := real.decidable_linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (6) ?x_161 : decidable_linear_ordered_comm_ring V := rat.decidable_linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (6) ?x_161 : decidable_linear_ordered_comm_ring V := int.decidable_linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (6) ?x_161 : decidable_linear_ordered_comm_ring V := @discrete_linear_ordered_field.to_decidable_linear_ordered_comm_ring ?x_162 ?x_163 | |
[class_instances] (7) ?x_163 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (7) ?x_163 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_161 : decidable_linear_ordered_comm_ring V := @linear_nonneg_ring.to_decidable_linear_ordered_comm_ring ?x_162 ?x_163 ?x_164 ?x_165 | |
[class_instances] (2) ?x_98 : comm_ring V := @field.to_comm_ring ?x_99 ?x_100 | |
[class_instances] (3) ?x_100 : field V := real.field | |
failed is_def_eq | |
[class_instances] (3) ?x_100 : field V := rat.field | |
failed is_def_eq | |
[class_instances] (3) ?x_100 : field V := @linear_ordered_field.to_field ?x_101 ?x_102 | |
[class_instances] (4) ?x_102 : linear_ordered_field V := real.linear_ordered_field | |
failed is_def_eq | |
[class_instances] (4) ?x_102 : linear_ordered_field V := rat.linear_ordered_field | |
failed is_def_eq | |
[class_instances] (4) ?x_102 : linear_ordered_field V := @discrete_linear_ordered_field.to_linear_ordered_field ?x_103 ?x_104 | |
[class_instances] (5) ?x_104 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_104 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (3) ?x_100 : field V := @discrete_field.to_field ?x_101 ?x_102 | |
[class_instances] (4) ?x_102 : discrete_field V := complex.discrete_field | |
failed is_def_eq | |
[class_instances] (4) ?x_102 : discrete_field V := @local_ring.residue_field.discrete_field ?x_103 ?x_104 | |
failed is_def_eq | |
[class_instances] (4) ?x_102 : discrete_field V := real.discrete_field | |
failed is_def_eq | |
[class_instances] (4) ?x_102 : discrete_field V := rat.discrete_field | |
failed is_def_eq | |
[class_instances] (4) ?x_102 : discrete_field V := @discrete_linear_ordered_field.to_discrete_field ?x_105 ?x_106 | |
[class_instances] (5) ?x_106 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_106 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (4) ?x_102 : discrete_field V := @normed_field.to_discrete_field ?x_103 ?x_104 | |
[class_instances] (5) ?x_104 : normed_field V := _inst_1 | |
failed is_def_eq | |
[class_instances] (5) ?x_104 : normed_field V := rat.normed_field | |
failed is_def_eq | |
[class_instances] (5) ?x_104 : normed_field V := normed_field.normed_field | |
failed is_def_eq | |
[class_instances] (5) ?x_104 : normed_field V := @nondiscrete_normed_field.to_normed_field ?x_105 ?x_106 | |
[class_instances] (6) ?x_106 : nondiscrete_normed_field V := rat.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_106 : nondiscrete_normed_field V := normed_field.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (2) ?x_98 : comm_ring V := @integral_domain.to_comm_ring ?x_99 ?x_100 | |
[class_instances] (3) ?x_100 : integral_domain V := @polynomial.integral_domain ?x_101 ?x_102 | |
failed is_def_eq | |
[class_instances] (3) ?x_100 : integral_domain V := @ideal.quotient.integral_domain ?x_103 ?x_104 ?x_105 ?x_106 | |
failed is_def_eq | |
[class_instances] (3) ?x_100 : integral_domain V := real.integral_domain | |
failed is_def_eq | |
[class_instances] (3) ?x_100 : integral_domain V := @subring.domain ?x_107 ?x_108 ?x_109 ?x_110 | |
failed is_def_eq | |
[class_instances] (3) ?x_100 : integral_domain V := rat.integral_domain | |
failed is_def_eq | |
[class_instances] (3) ?x_100 : integral_domain V := @euclidean_domain.integral_domain ?x_111 ?x_112 | |
[class_instances] (4) ?x_112 : euclidean_domain V := @polynomial.euclidean_domain ?x_113 ?x_114 | |
failed is_def_eq | |
[class_instances] (4) ?x_112 : euclidean_domain V := int.euclidean_domain | |
failed is_def_eq | |
[class_instances] (4) ?x_112 : euclidean_domain V := @discrete_field.to_euclidean_domain ?x_115 ?x_116 | |
[class_instances] (5) ?x_116 : discrete_field V := complex.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_116 : discrete_field V := @local_ring.residue_field.discrete_field ?x_117 ?x_118 | |
failed is_def_eq | |
[class_instances] (5) ?x_116 : discrete_field V := real.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_116 : discrete_field V := rat.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_116 : discrete_field V := @discrete_linear_ordered_field.to_discrete_field ?x_119 ?x_120 | |
[class_instances] (6) ?x_120 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_120 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_116 : discrete_field V := @normed_field.to_discrete_field ?x_117 ?x_118 | |
[class_instances] (6) ?x_118 : normed_field V := _inst_1 | |
failed is_def_eq | |
[class_instances] (6) ?x_118 : normed_field V := rat.normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_118 : normed_field V := normed_field.normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_118 : normed_field V := @nondiscrete_normed_field.to_normed_field ?x_119 ?x_120 | |
[class_instances] (7) ?x_120 : nondiscrete_normed_field V := rat.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (7) ?x_120 : nondiscrete_normed_field V := normed_field.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (3) ?x_100 : integral_domain V := @normalization_domain.to_integral_domain ?x_101 ?x_102 | |
[class_instances] (4) ?x_102 : normalization_domain V := @polynomial.normalization_domain ?x_103 ?x_104 | |
failed is_def_eq | |
[class_instances] (4) ?x_102 : normalization_domain V := int.normalization_domain | |
failed is_def_eq | |
[class_instances] (4) ?x_102 : normalization_domain V := @gcd_domain.to_normalization_domain ?x_105 ?x_106 | |
[class_instances] (5) ?x_106 : gcd_domain V := int.gcd_domain | |
failed is_def_eq | |
[class_instances] (3) ?x_100 : integral_domain V := @field.to_integral_domain ?x_101 ?x_102 | |
[class_instances] (4) ?x_102 : field V := real.field | |
failed is_def_eq | |
[class_instances] (4) ?x_102 : field V := rat.field | |
failed is_def_eq | |
[class_instances] (4) ?x_102 : field V := @linear_ordered_field.to_field ?x_103 ?x_104 | |
[class_instances] (5) ?x_104 : linear_ordered_field V := real.linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_104 : linear_ordered_field V := rat.linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_104 : linear_ordered_field V := @discrete_linear_ordered_field.to_linear_ordered_field ?x_105 ?x_106 | |
[class_instances] (6) ?x_106 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_106 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (4) ?x_102 : field V := @discrete_field.to_field ?x_103 ?x_104 | |
[class_instances] (5) ?x_104 : discrete_field V := complex.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_104 : discrete_field V := @local_ring.residue_field.discrete_field ?x_105 ?x_106 | |
failed is_def_eq | |
[class_instances] (5) ?x_104 : discrete_field V := real.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_104 : discrete_field V := rat.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_104 : discrete_field V := @discrete_linear_ordered_field.to_discrete_field ?x_107 ?x_108 | |
[class_instances] (6) ?x_108 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_108 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_104 : discrete_field V := @normed_field.to_discrete_field ?x_105 ?x_106 | |
[class_instances] (6) ?x_106 : normed_field V := _inst_1 | |
failed is_def_eq | |
[class_instances] (6) ?x_106 : normed_field V := rat.normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_106 : normed_field V := normed_field.normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_106 : normed_field V := @nondiscrete_normed_field.to_normed_field ?x_107 ?x_108 | |
[class_instances] (7) ?x_108 : nondiscrete_normed_field V := rat.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (7) ?x_108 : nondiscrete_normed_field V := normed_field.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (3) ?x_100 : integral_domain V := @discrete_field.to_integral_domain ?x_101 ?x_102 ?x_103 | |
[class_instances] (4) ?x_102 : discrete_field V := complex.discrete_field | |
failed is_def_eq | |
[class_instances] (4) ?x_102 : discrete_field V := @local_ring.residue_field.discrete_field ?x_104 ?x_105 | |
failed is_def_eq | |
[class_instances] (4) ?x_102 : discrete_field V := real.discrete_field | |
failed is_def_eq | |
[class_instances] (4) ?x_102 : discrete_field V := rat.discrete_field | |
failed is_def_eq | |
[class_instances] (4) ?x_102 : discrete_field V := @discrete_linear_ordered_field.to_discrete_field ?x_106 ?x_107 | |
[class_instances] (5) ?x_107 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_107 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (4) ?x_102 : discrete_field V := @normed_field.to_discrete_field ?x_104 ?x_105 | |
[class_instances] (5) ?x_105 : normed_field V := _inst_1 | |
failed is_def_eq | |
[class_instances] (5) ?x_105 : normed_field V := rat.normed_field | |
failed is_def_eq | |
[class_instances] (5) ?x_105 : normed_field V := normed_field.normed_field | |
failed is_def_eq | |
[class_instances] (5) ?x_105 : normed_field V := @nondiscrete_normed_field.to_normed_field ?x_106 ?x_107 | |
[class_instances] (6) ?x_107 : nondiscrete_normed_field V := rat.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_107 : nondiscrete_normed_field V := normed_field.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (3) ?x_100 : integral_domain V := @linear_ordered_comm_ring.to_integral_domain ?x_101 ?x_102 | |
[class_instances] (4) ?x_102 : linear_ordered_comm_ring V := real.linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (4) ?x_102 : linear_ordered_comm_ring V := rat.linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (4) ?x_102 : linear_ordered_comm_ring V := @decidable_linear_ordered_comm_ring.to_linear_ordered_comm_ring ?x_103 ?x_104 | |
[class_instances] (5) ?x_104 : decidable_linear_ordered_comm_ring V := real.decidable_linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (5) ?x_104 : decidable_linear_ordered_comm_ring V := rat.decidable_linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (5) ?x_104 : decidable_linear_ordered_comm_ring V := int.decidable_linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (5) ?x_104 : decidable_linear_ordered_comm_ring V := @discrete_linear_ordered_field.to_decidable_linear_ordered_comm_ring ?x_105 ?x_106 | |
[class_instances] (6) ?x_106 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_106 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_104 : decidable_linear_ordered_comm_ring V := @linear_nonneg_ring.to_decidable_linear_ordered_comm_ring ?x_105 ?x_106 ?x_107 ?x_108 | |
[class_instances] (5) ?x_96 : normed_field k := rat.normed_field | |
failed is_def_eq | |
[class_instances] (5) ?x_96 : normed_field k := normed_field.normed_field | |
failed is_def_eq | |
[class_instances] (5) ?x_96 : normed_field k := @nondiscrete_normed_field.to_normed_field ?x_97 ?x_98 | |
[class_instances] (6) ?x_98 : nondiscrete_normed_field k := rat.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_98 : nondiscrete_normed_field k := normed_field.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (2) ?x_82 : nonzero_comm_ring k := @local_ring.to_nonzero_comm_ring ?x_83 ?x_84 | |
[class_instances] (3) ?x_84 : local_ring k := @discrete_field.local_ring ?x_85 ?x_86 | |
[class_instances] (4) ?x_86 : discrete_field k := complex.discrete_field | |
failed is_def_eq | |
[class_instances] (4) ?x_86 : discrete_field k := @local_ring.residue_field.discrete_field ?x_87 ?x_88 | |
failed is_def_eq | |
[class_instances] (4) ?x_86 : discrete_field k := real.discrete_field | |
failed is_def_eq | |
[class_instances] (4) ?x_86 : discrete_field k := rat.discrete_field | |
failed is_def_eq | |
[class_instances] (4) ?x_86 : discrete_field k := @discrete_linear_ordered_field.to_discrete_field ?x_89 ?x_90 | |
[class_instances] (5) ?x_90 : discrete_linear_ordered_field k := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_90 : discrete_linear_ordered_field k := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (4) ?x_86 : discrete_field k := @normed_field.to_discrete_field ?x_87 ?x_88 | |
[class_instances] (5) ?x_88 : normed_field k := _inst_1 | |
[class_instances] (1) ?x_24 : ring V := @continuous_linear_map.ring ?x_89 ?x_90 ?x_91 ?x_92 ?x_93 ?x_94 ?x_95 | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := @subalgebra.ring ?x_96 ?x_97 ?x_98 ?x_99 ?x_100 ?x_101 | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := @algebra.comap.ring ?x_102 ?x_103 ?x_104 ?x_105 ?x_106 ?x_107 ?x_108 ?x_109 | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := @free_abelian_group.ring ?x_110 ?x_111 | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := @matrix.ring ?x_112 ?x_113 ?x_114 ?x_115 ?x_116 | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := @mv_polynomial.ring ?x_117 ?x_118 ?x_119 | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := real.ring | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := @cau_seq.ring ?x_120 ?x_121 ?x_122 ?x_123 ?x_124 ?x_125 | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := @linear_map.endomorphism_ring ?x_126 ?x_127 ?x_128 ?x_129 ?x_130 | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := @finsupp.ring ?x_131 ?x_132 ?x_133 ?x_134 | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := @prod.ring ?x_135 ?x_136 ?x_137 ?x_138 | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := @pi.ring ?x_139 ?x_140 ?x_141 | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := @subtype.ring ?x_142 ?x_143 ?x_144 ?x_145 | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := @subset.ring ?x_146 ?x_147 ?x_148 ?x_149 | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := int.ring | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := @normed_ring.to_ring ?x_150 ?x_151 | |
[class_instances] (2) ?x_151 : normed_ring V := int.normed_ring | |
failed is_def_eq | |
[class_instances] (2) ?x_151 : normed_ring V := @prod.normed_ring ?x_152 ?x_153 ?x_154 ?x_155 | |
failed is_def_eq | |
[class_instances] (2) ?x_151 : normed_ring V := @normed_field.to_normed_ring ?x_156 ?x_157 | |
[class_instances] (3) ?x_157 : normed_field V := _inst_1 | |
failed is_def_eq | |
[class_instances] (3) ?x_157 : normed_field V := rat.normed_field | |
failed is_def_eq | |
[class_instances] (3) ?x_157 : normed_field V := normed_field.normed_field | |
failed is_def_eq | |
[class_instances] (3) ?x_157 : normed_field V := @nondiscrete_normed_field.to_normed_field ?x_158 ?x_159 | |
[class_instances] (4) ?x_159 : nondiscrete_normed_field V := rat.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (4) ?x_159 : nondiscrete_normed_field V := normed_field.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := @nonneg_ring.to_ring ?x_89 ?x_90 | |
[class_instances] (2) ?x_90 : nonneg_ring V := @linear_nonneg_ring.to_nonneg_ring ?x_91 ?x_92 | |
[class_instances] (1) ?x_24 : ring V := @domain.to_ring ?x_89 ?x_90 | |
[class_instances] (2) ?x_90 : domain V := real.domain | |
failed is_def_eq | |
[class_instances] (2) ?x_90 : domain V := @division_ring.to_domain ?x_91 ?x_92 | |
[class_instances] (3) ?x_92 : division_ring V := real.division_ring | |
failed is_def_eq | |
[class_instances] (3) ?x_92 : division_ring V := rat.division_ring | |
failed is_def_eq | |
[class_instances] (3) ?x_92 : division_ring V := @field.to_division_ring ?x_93 ?x_94 | |
[class_instances] (4) ?x_94 : field V := real.field | |
failed is_def_eq | |
[class_instances] (4) ?x_94 : field V := rat.field | |
failed is_def_eq | |
[class_instances] (4) ?x_94 : field V := @linear_ordered_field.to_field ?x_95 ?x_96 | |
[class_instances] (5) ?x_96 : linear_ordered_field V := real.linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_96 : linear_ordered_field V := rat.linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_96 : linear_ordered_field V := @discrete_linear_ordered_field.to_linear_ordered_field ?x_97 ?x_98 | |
[class_instances] (6) ?x_98 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_98 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (4) ?x_94 : field V := @discrete_field.to_field ?x_95 ?x_96 | |
[class_instances] (5) ?x_96 : discrete_field V := complex.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_96 : discrete_field V := @local_ring.residue_field.discrete_field ?x_97 ?x_98 | |
failed is_def_eq | |
[class_instances] (5) ?x_96 : discrete_field V := real.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_96 : discrete_field V := rat.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_96 : discrete_field V := @discrete_linear_ordered_field.to_discrete_field ?x_99 ?x_100 | |
[class_instances] (6) ?x_100 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_100 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_96 : discrete_field V := @normed_field.to_discrete_field ?x_97 ?x_98 | |
[class_instances] (6) ?x_98 : normed_field V := _inst_1 | |
failed is_def_eq | |
[class_instances] (6) ?x_98 : normed_field V := rat.normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_98 : normed_field V := normed_field.normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_98 : normed_field V := @nondiscrete_normed_field.to_normed_field ?x_99 ?x_100 | |
[class_instances] (7) ?x_100 : nondiscrete_normed_field V := rat.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (7) ?x_100 : nondiscrete_normed_field V := normed_field.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (2) ?x_90 : domain V := @linear_nonneg_ring.to_domain ?x_91 ?x_92 | |
[class_instances] (2) ?x_90 : domain V := @linear_ordered_ring.to_domain ?x_91 ?x_92 | |
[class_instances] (3) ?x_92 : linear_ordered_ring V := real.linear_ordered_ring | |
failed is_def_eq | |
[class_instances] (3) ?x_92 : linear_ordered_ring V := rat.linear_ordered_ring | |
failed is_def_eq | |
[class_instances] (3) ?x_92 : linear_ordered_ring V := @linear_ordered_field.to_linear_ordered_ring ?x_93 ?x_94 | |
[class_instances] (4) ?x_94 : linear_ordered_field V := real.linear_ordered_field | |
failed is_def_eq | |
[class_instances] (4) ?x_94 : linear_ordered_field V := rat.linear_ordered_field | |
failed is_def_eq | |
[class_instances] (4) ?x_94 : linear_ordered_field V := @discrete_linear_ordered_field.to_linear_ordered_field ?x_95 ?x_96 | |
[class_instances] (5) ?x_96 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_96 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (3) ?x_92 : linear_ordered_ring V := @linear_nonneg_ring.to_linear_ordered_ring ?x_93 ?x_94 | |
[class_instances] (3) ?x_92 : linear_ordered_ring V := @linear_ordered_comm_ring.to_linear_ordered_ring ?x_93 ?x_94 | |
[class_instances] (4) ?x_94 : linear_ordered_comm_ring V := real.linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (4) ?x_94 : linear_ordered_comm_ring V := rat.linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (4) ?x_94 : linear_ordered_comm_ring V := @decidable_linear_ordered_comm_ring.to_linear_ordered_comm_ring ?x_95 ?x_96 | |
[class_instances] (5) ?x_96 : decidable_linear_ordered_comm_ring V := real.decidable_linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (5) ?x_96 : decidable_linear_ordered_comm_ring V := rat.decidable_linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (5) ?x_96 : decidable_linear_ordered_comm_ring V := int.decidable_linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (5) ?x_96 : decidable_linear_ordered_comm_ring V := @discrete_linear_ordered_field.to_decidable_linear_ordered_comm_ring ?x_97 ?x_98 | |
[class_instances] (6) ?x_98 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_98 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_96 : decidable_linear_ordered_comm_ring V := @linear_nonneg_ring.to_decidable_linear_ordered_comm_ring ?x_97 ?x_98 ?x_99 ?x_100 | |
[class_instances] (2) ?x_90 : domain V := @integral_domain.to_domain ?x_91 ?x_92 | |
[class_instances] (3) ?x_92 : integral_domain V := @polynomial.integral_domain ?x_93 ?x_94 | |
failed is_def_eq | |
[class_instances] (3) ?x_92 : integral_domain V := @ideal.quotient.integral_domain ?x_95 ?x_96 ?x_97 ?x_98 | |
failed is_def_eq | |
[class_instances] (3) ?x_92 : integral_domain V := real.integral_domain | |
failed is_def_eq | |
[class_instances] (3) ?x_92 : integral_domain V := @subring.domain ?x_99 ?x_100 ?x_101 ?x_102 | |
failed is_def_eq | |
[class_instances] (3) ?x_92 : integral_domain V := rat.integral_domain | |
failed is_def_eq | |
[class_instances] (3) ?x_92 : integral_domain V := @euclidean_domain.integral_domain ?x_103 ?x_104 | |
[class_instances] (4) ?x_104 : euclidean_domain V := @polynomial.euclidean_domain ?x_105 ?x_106 | |
failed is_def_eq | |
[class_instances] (4) ?x_104 : euclidean_domain V := int.euclidean_domain | |
failed is_def_eq | |
[class_instances] (4) ?x_104 : euclidean_domain V := @discrete_field.to_euclidean_domain ?x_107 ?x_108 | |
[class_instances] (5) ?x_108 : discrete_field V := complex.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_108 : discrete_field V := @local_ring.residue_field.discrete_field ?x_109 ?x_110 | |
failed is_def_eq | |
[class_instances] (5) ?x_108 : discrete_field V := real.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_108 : discrete_field V := rat.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_108 : discrete_field V := @discrete_linear_ordered_field.to_discrete_field ?x_111 ?x_112 | |
[class_instances] (6) ?x_112 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_112 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_108 : discrete_field V := @normed_field.to_discrete_field ?x_109 ?x_110 | |
[class_instances] (6) ?x_110 : normed_field V := _inst_1 | |
failed is_def_eq | |
[class_instances] (6) ?x_110 : normed_field V := rat.normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_110 : normed_field V := normed_field.normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_110 : normed_field V := @nondiscrete_normed_field.to_normed_field ?x_111 ?x_112 | |
[class_instances] (7) ?x_112 : nondiscrete_normed_field V := rat.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (7) ?x_112 : nondiscrete_normed_field V := normed_field.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (3) ?x_92 : integral_domain V := @normalization_domain.to_integral_domain ?x_93 ?x_94 | |
[class_instances] (4) ?x_94 : normalization_domain V := @polynomial.normalization_domain ?x_95 ?x_96 | |
failed is_def_eq | |
[class_instances] (4) ?x_94 : normalization_domain V := int.normalization_domain | |
failed is_def_eq | |
[class_instances] (4) ?x_94 : normalization_domain V := @gcd_domain.to_normalization_domain ?x_97 ?x_98 | |
[class_instances] (5) ?x_98 : gcd_domain V := int.gcd_domain | |
failed is_def_eq | |
[class_instances] (3) ?x_92 : integral_domain V := @field.to_integral_domain ?x_93 ?x_94 | |
[class_instances] (4) ?x_94 : field V := real.field | |
failed is_def_eq | |
[class_instances] (4) ?x_94 : field V := rat.field | |
failed is_def_eq | |
[class_instances] (4) ?x_94 : field V := @linear_ordered_field.to_field ?x_95 ?x_96 | |
[class_instances] (5) ?x_96 : linear_ordered_field V := real.linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_96 : linear_ordered_field V := rat.linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_96 : linear_ordered_field V := @discrete_linear_ordered_field.to_linear_ordered_field ?x_97 ?x_98 | |
[class_instances] (6) ?x_98 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_98 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (4) ?x_94 : field V := @discrete_field.to_field ?x_95 ?x_96 | |
[class_instances] (5) ?x_96 : discrete_field V := complex.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_96 : discrete_field V := @local_ring.residue_field.discrete_field ?x_97 ?x_98 | |
failed is_def_eq | |
[class_instances] (5) ?x_96 : discrete_field V := real.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_96 : discrete_field V := rat.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_96 : discrete_field V := @discrete_linear_ordered_field.to_discrete_field ?x_99 ?x_100 | |
[class_instances] (6) ?x_100 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_100 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_96 : discrete_field V := @normed_field.to_discrete_field ?x_97 ?x_98 | |
[class_instances] (6) ?x_98 : normed_field V := _inst_1 | |
failed is_def_eq | |
[class_instances] (6) ?x_98 : normed_field V := rat.normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_98 : normed_field V := normed_field.normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_98 : normed_field V := @nondiscrete_normed_field.to_normed_field ?x_99 ?x_100 | |
[class_instances] (7) ?x_100 : nondiscrete_normed_field V := rat.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (7) ?x_100 : nondiscrete_normed_field V := normed_field.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (3) ?x_92 : integral_domain V := @discrete_field.to_integral_domain ?x_93 ?x_94 ?x_95 | |
[class_instances] (4) ?x_94 : discrete_field V := complex.discrete_field | |
failed is_def_eq | |
[class_instances] (4) ?x_94 : discrete_field V := @local_ring.residue_field.discrete_field ?x_96 ?x_97 | |
failed is_def_eq | |
[class_instances] (4) ?x_94 : discrete_field V := real.discrete_field | |
failed is_def_eq | |
[class_instances] (4) ?x_94 : discrete_field V := rat.discrete_field | |
failed is_def_eq | |
[class_instances] (4) ?x_94 : discrete_field V := @discrete_linear_ordered_field.to_discrete_field ?x_98 ?x_99 | |
[class_instances] (5) ?x_99 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_99 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (4) ?x_94 : discrete_field V := @normed_field.to_discrete_field ?x_96 ?x_97 | |
[class_instances] (5) ?x_97 : normed_field V := _inst_1 | |
failed is_def_eq | |
[class_instances] (5) ?x_97 : normed_field V := rat.normed_field | |
failed is_def_eq | |
[class_instances] (5) ?x_97 : normed_field V := normed_field.normed_field | |
failed is_def_eq | |
[class_instances] (5) ?x_97 : normed_field V := @nondiscrete_normed_field.to_normed_field ?x_98 ?x_99 | |
[class_instances] (6) ?x_99 : nondiscrete_normed_field V := rat.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_99 : nondiscrete_normed_field V := normed_field.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (3) ?x_92 : integral_domain V := @linear_ordered_comm_ring.to_integral_domain ?x_93 ?x_94 | |
[class_instances] (4) ?x_94 : linear_ordered_comm_ring V := real.linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (4) ?x_94 : linear_ordered_comm_ring V := rat.linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (4) ?x_94 : linear_ordered_comm_ring V := @decidable_linear_ordered_comm_ring.to_linear_ordered_comm_ring ?x_95 ?x_96 | |
[class_instances] (5) ?x_96 : decidable_linear_ordered_comm_ring V := real.decidable_linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (5) ?x_96 : decidable_linear_ordered_comm_ring V := rat.decidable_linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (5) ?x_96 : decidable_linear_ordered_comm_ring V := int.decidable_linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (5) ?x_96 : decidable_linear_ordered_comm_ring V := @discrete_linear_ordered_field.to_decidable_linear_ordered_comm_ring ?x_97 ?x_98 | |
[class_instances] (6) ?x_98 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_98 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_96 : decidable_linear_ordered_comm_ring V := @linear_nonneg_ring.to_decidable_linear_ordered_comm_ring ?x_97 ?x_98 ?x_99 ?x_100 | |
[class_instances] (1) ?x_24 : ring V := @division_ring.to_ring ?x_89 ?x_90 | |
[class_instances] (2) ?x_90 : division_ring V := real.division_ring | |
failed is_def_eq | |
[class_instances] (2) ?x_90 : division_ring V := rat.division_ring | |
failed is_def_eq | |
[class_instances] (2) ?x_90 : division_ring V := @field.to_division_ring ?x_91 ?x_92 | |
[class_instances] (3) ?x_92 : field V := real.field | |
failed is_def_eq | |
[class_instances] (3) ?x_92 : field V := rat.field | |
failed is_def_eq | |
[class_instances] (3) ?x_92 : field V := @linear_ordered_field.to_field ?x_93 ?x_94 | |
[class_instances] (4) ?x_94 : linear_ordered_field V := real.linear_ordered_field | |
failed is_def_eq | |
[class_instances] (4) ?x_94 : linear_ordered_field V := rat.linear_ordered_field | |
failed is_def_eq | |
[class_instances] (4) ?x_94 : linear_ordered_field V := @discrete_linear_ordered_field.to_linear_ordered_field ?x_95 ?x_96 | |
[class_instances] (5) ?x_96 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_96 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (3) ?x_92 : field V := @discrete_field.to_field ?x_93 ?x_94 | |
[class_instances] (4) ?x_94 : discrete_field V := complex.discrete_field | |
failed is_def_eq | |
[class_instances] (4) ?x_94 : discrete_field V := @local_ring.residue_field.discrete_field ?x_95 ?x_96 | |
failed is_def_eq | |
[class_instances] (4) ?x_94 : discrete_field V := real.discrete_field | |
failed is_def_eq | |
[class_instances] (4) ?x_94 : discrete_field V := rat.discrete_field | |
failed is_def_eq | |
[class_instances] (4) ?x_94 : discrete_field V := @discrete_linear_ordered_field.to_discrete_field ?x_97 ?x_98 | |
[class_instances] (5) ?x_98 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_98 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (4) ?x_94 : discrete_field V := @normed_field.to_discrete_field ?x_95 ?x_96 | |
[class_instances] (5) ?x_96 : normed_field V := _inst_1 | |
failed is_def_eq | |
[class_instances] (5) ?x_96 : normed_field V := rat.normed_field | |
failed is_def_eq | |
[class_instances] (5) ?x_96 : normed_field V := normed_field.normed_field | |
failed is_def_eq | |
[class_instances] (5) ?x_96 : normed_field V := @nondiscrete_normed_field.to_normed_field ?x_97 ?x_98 | |
[class_instances] (6) ?x_98 : nondiscrete_normed_field V := rat.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_98 : nondiscrete_normed_field V := normed_field.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := @ordered_ring.to_ring ?x_89 ?x_90 | |
[class_instances] (2) ?x_90 : ordered_ring V := real.ordered_ring | |
failed is_def_eq | |
[class_instances] (2) ?x_90 : ordered_ring V := rat.ordered_ring | |
failed is_def_eq | |
[class_instances] (2) ?x_90 : ordered_ring V := @nonneg_ring.to_ordered_ring ?x_91 ?x_92 | |
[class_instances] (3) ?x_92 : nonneg_ring V := @linear_nonneg_ring.to_nonneg_ring ?x_93 ?x_94 | |
[class_instances] (2) ?x_90 : ordered_ring V := @linear_ordered_ring.to_ordered_ring ?x_91 ?x_92 | |
[class_instances] (3) ?x_92 : linear_ordered_ring V := real.linear_ordered_ring | |
failed is_def_eq | |
[class_instances] (3) ?x_92 : linear_ordered_ring V := rat.linear_ordered_ring | |
failed is_def_eq | |
[class_instances] (3) ?x_92 : linear_ordered_ring V := @linear_ordered_field.to_linear_ordered_ring ?x_93 ?x_94 | |
[class_instances] (4) ?x_94 : linear_ordered_field V := real.linear_ordered_field | |
failed is_def_eq | |
[class_instances] (4) ?x_94 : linear_ordered_field V := rat.linear_ordered_field | |
failed is_def_eq | |
[class_instances] (4) ?x_94 : linear_ordered_field V := @discrete_linear_ordered_field.to_linear_ordered_field ?x_95 ?x_96 | |
[class_instances] (5) ?x_96 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_96 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (3) ?x_92 : linear_ordered_ring V := @linear_nonneg_ring.to_linear_ordered_ring ?x_93 ?x_94 | |
[class_instances] (3) ?x_92 : linear_ordered_ring V := @linear_ordered_comm_ring.to_linear_ordered_ring ?x_93 ?x_94 | |
[class_instances] (4) ?x_94 : linear_ordered_comm_ring V := real.linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (4) ?x_94 : linear_ordered_comm_ring V := rat.linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (4) ?x_94 : linear_ordered_comm_ring V := @decidable_linear_ordered_comm_ring.to_linear_ordered_comm_ring ?x_95 ?x_96 | |
[class_instances] (5) ?x_96 : decidable_linear_ordered_comm_ring V := real.decidable_linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (5) ?x_96 : decidable_linear_ordered_comm_ring V := rat.decidable_linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (5) ?x_96 : decidable_linear_ordered_comm_ring V := int.decidable_linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (5) ?x_96 : decidable_linear_ordered_comm_ring V := @discrete_linear_ordered_field.to_decidable_linear_ordered_comm_ring ?x_97 ?x_98 | |
[class_instances] (6) ?x_98 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_98 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_96 : decidable_linear_ordered_comm_ring V := @linear_nonneg_ring.to_decidable_linear_ordered_comm_ring ?x_97 ?x_98 ?x_99 ?x_100 | |
[class_instances] (1) ?x_24 : ring V := @comm_ring.to_ring ?x_89 ?x_90 | |
[class_instances] (2) ?x_90 : comm_ring V := @subalgebra.comm_ring ?x_91 ?x_92 ?x_93 ?x_94 ?x_95 ?x_96 | |
failed is_def_eq | |
[class_instances] (2) ?x_90 : comm_ring V := @algebra.comap.comm_ring ?x_97 ?x_98 ?x_99 ?x_100 ?x_101 ?x_102 ?x_103 ?x_104 | |
failed is_def_eq | |
[class_instances] (2) ?x_90 : comm_ring V := @free_abelian_group.comm_ring ?x_105 ?x_106 | |
failed is_def_eq | |
[class_instances] (2) ?x_90 : comm_ring V := @mv_polynomial.comm_ring ?x_107 ?x_108 ?x_109 | |
failed is_def_eq | |
[class_instances] (2) ?x_90 : comm_ring V := @polynomial.comm_ring ?x_110 ?x_111 | |
failed is_def_eq | |
[class_instances] (2) ?x_90 : comm_ring V := complex.comm_ring | |
failed is_def_eq | |
[class_instances] (2) ?x_90 : comm_ring V := @ideal.quotient.comm_ring ?x_112 ?x_113 ?x_114 | |
failed is_def_eq | |
[class_instances] (2) ?x_90 : comm_ring V := real.comm_ring | |
failed is_def_eq | |
[class_instances] (2) ?x_90 : comm_ring V := @cau_seq.completion.comm_ring ?x_115 ?x_116 ?x_117 ?x_118 ?x_119 ?x_120 | |
failed is_def_eq | |
[class_instances] (2) ?x_90 : comm_ring V := @cau_seq.comm_ring ?x_121 ?x_122 ?x_123 ?x_124 ?x_125 ?x_126 | |
failed is_def_eq | |
[class_instances] (2) ?x_90 : comm_ring V := @finsupp.comm_ring ?x_127 ?x_128 ?x_129 ?x_130 | |
failed is_def_eq | |
[class_instances] (2) ?x_90 : comm_ring V := @prod.comm_ring ?x_131 ?x_132 ?x_133 ?x_134 | |
failed is_def_eq | |
[class_instances] (2) ?x_90 : comm_ring V := @pi.comm_ring ?x_135 ?x_136 ?x_137 | |
failed is_def_eq | |
[class_instances] (2) ?x_90 : comm_ring V := @subtype.comm_ring ?x_138 ?x_139 ?x_140 ?x_141 | |
failed is_def_eq | |
[class_instances] (2) ?x_90 : comm_ring V := @subset.comm_ring ?x_142 ?x_143 ?x_144 ?x_145 | |
failed is_def_eq | |
[class_instances] (2) ?x_90 : comm_ring V := rat.comm_ring | |
failed is_def_eq | |
[class_instances] (2) ?x_90 : comm_ring V := int.comm_ring | |
failed is_def_eq | |
[class_instances] (2) ?x_90 : comm_ring V := @nonzero_comm_ring.to_comm_ring ?x_146 ?x_147 | |
[class_instances] (3) ?x_147 : nonzero_comm_ring V := @polynomial.nonzero_comm_ring ?x_148 ?x_149 | |
failed is_def_eq | |
[class_instances] (3) ?x_147 : nonzero_comm_ring V := real.nonzero_comm_ring | |
failed is_def_eq | |
[class_instances] (3) ?x_147 : nonzero_comm_ring V := @prod.nonzero_comm_ring ?x_150 ?x_151 ?x_152 ?x_153 | |
failed is_def_eq | |
[class_instances] (3) ?x_147 : nonzero_comm_ring V := rat.nonzero_comm_ring | |
failed is_def_eq | |
[class_instances] (3) ?x_147 : nonzero_comm_ring V := @euclidean_domain.to_nonzero_comm_ring ?x_154 ?x_155 | |
[class_instances] (4) ?x_155 : euclidean_domain V := @polynomial.euclidean_domain ?x_156 ?x_157 | |
failed is_def_eq | |
[class_instances] (4) ?x_155 : euclidean_domain V := int.euclidean_domain | |
failed is_def_eq | |
[class_instances] (4) ?x_155 : euclidean_domain V := @discrete_field.to_euclidean_domain ?x_158 ?x_159 | |
[class_instances] (5) ?x_159 : discrete_field V := complex.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_159 : discrete_field V := @local_ring.residue_field.discrete_field ?x_160 ?x_161 | |
failed is_def_eq | |
[class_instances] (5) ?x_159 : discrete_field V := real.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_159 : discrete_field V := rat.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_159 : discrete_field V := @discrete_linear_ordered_field.to_discrete_field ?x_162 ?x_163 | |
[class_instances] (6) ?x_163 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_163 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_159 : discrete_field V := @normed_field.to_discrete_field ?x_160 ?x_161 | |
[class_instances] (6) ?x_161 : normed_field V := _inst_1 | |
failed is_def_eq | |
[class_instances] (6) ?x_161 : normed_field V := rat.normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_161 : normed_field V := normed_field.normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_161 : normed_field V := @nondiscrete_normed_field.to_normed_field ?x_162 ?x_163 | |
[class_instances] (7) ?x_163 : nondiscrete_normed_field V := rat.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (7) ?x_163 : nondiscrete_normed_field V := normed_field.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (3) ?x_147 : nonzero_comm_ring V := @local_ring.to_nonzero_comm_ring ?x_148 ?x_149 | |
[class_instances] (4) ?x_149 : local_ring V := @discrete_field.local_ring ?x_150 ?x_151 | |
[class_instances] (5) ?x_151 : discrete_field V := complex.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_151 : discrete_field V := @local_ring.residue_field.discrete_field ?x_152 ?x_153 | |
failed is_def_eq | |
[class_instances] (5) ?x_151 : discrete_field V := real.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_151 : discrete_field V := rat.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_151 : discrete_field V := @discrete_linear_ordered_field.to_discrete_field ?x_154 ?x_155 | |
[class_instances] (6) ?x_155 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_155 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_151 : discrete_field V := @normed_field.to_discrete_field ?x_152 ?x_153 | |
[class_instances] (6) ?x_153 : normed_field V := _inst_1 | |
failed is_def_eq | |
[class_instances] (6) ?x_153 : normed_field V := rat.normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_153 : normed_field V := normed_field.normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_153 : normed_field V := @nondiscrete_normed_field.to_normed_field ?x_154 ?x_155 | |
[class_instances] (7) ?x_155 : nondiscrete_normed_field V := rat.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (7) ?x_155 : nondiscrete_normed_field V := normed_field.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (3) ?x_147 : nonzero_comm_ring V := @integral_domain.to_nonzero_comm_ring ?x_148 ?x_149 | |
[class_instances] (4) ?x_149 : integral_domain V := @polynomial.integral_domain ?x_150 ?x_151 | |
failed is_def_eq | |
[class_instances] (4) ?x_149 : integral_domain V := @ideal.quotient.integral_domain ?x_152 ?x_153 ?x_154 ?x_155 | |
failed is_def_eq | |
[class_instances] (4) ?x_149 : integral_domain V := real.integral_domain | |
failed is_def_eq | |
[class_instances] (4) ?x_149 : integral_domain V := @subring.domain ?x_156 ?x_157 ?x_158 ?x_159 | |
failed is_def_eq | |
[class_instances] (4) ?x_149 : integral_domain V := rat.integral_domain | |
failed is_def_eq | |
[class_instances] (4) ?x_149 : integral_domain V := @euclidean_domain.integral_domain ?x_160 ?x_161 | |
[class_instances] (5) ?x_161 : euclidean_domain V := @polynomial.euclidean_domain ?x_162 ?x_163 | |
failed is_def_eq | |
[class_instances] (5) ?x_161 : euclidean_domain V := int.euclidean_domain | |
failed is_def_eq | |
[class_instances] (5) ?x_161 : euclidean_domain V := @discrete_field.to_euclidean_domain ?x_164 ?x_165 | |
[class_instances] (6) ?x_165 : discrete_field V := complex.discrete_field | |
failed is_def_eq | |
[class_instances] (6) ?x_165 : discrete_field V := @local_ring.residue_field.discrete_field ?x_166 ?x_167 | |
failed is_def_eq | |
[class_instances] (6) ?x_165 : discrete_field V := real.discrete_field | |
failed is_def_eq | |
[class_instances] (6) ?x_165 : discrete_field V := rat.discrete_field | |
failed is_def_eq | |
[class_instances] (6) ?x_165 : discrete_field V := @discrete_linear_ordered_field.to_discrete_field ?x_168 ?x_169 | |
[class_instances] (7) ?x_169 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (7) ?x_169 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_165 : discrete_field V := @normed_field.to_discrete_field ?x_166 ?x_167 | |
[class_instances] (7) ?x_167 : normed_field V := _inst_1 | |
failed is_def_eq | |
[class_instances] (7) ?x_167 : normed_field V := rat.normed_field | |
failed is_def_eq | |
[class_instances] (7) ?x_167 : normed_field V := normed_field.normed_field | |
failed is_def_eq | |
[class_instances] (7) ?x_167 : normed_field V := @nondiscrete_normed_field.to_normed_field ?x_168 ?x_169 | |
[class_instances] (8) ?x_169 : nondiscrete_normed_field V := rat.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (8) ?x_169 : nondiscrete_normed_field V := normed_field.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (4) ?x_149 : integral_domain V := @normalization_domain.to_integral_domain ?x_150 ?x_151 | |
[class_instances] (5) ?x_151 : normalization_domain V := @polynomial.normalization_domain ?x_152 ?x_153 | |
failed is_def_eq | |
[class_instances] (5) ?x_151 : normalization_domain V := int.normalization_domain | |
failed is_def_eq | |
[class_instances] (5) ?x_151 : normalization_domain V := @gcd_domain.to_normalization_domain ?x_154 ?x_155 | |
[class_instances] (6) ?x_155 : gcd_domain V := int.gcd_domain | |
failed is_def_eq | |
[class_instances] (4) ?x_149 : integral_domain V := @field.to_integral_domain ?x_150 ?x_151 | |
[class_instances] (5) ?x_151 : field V := real.field | |
failed is_def_eq | |
[class_instances] (5) ?x_151 : field V := rat.field | |
failed is_def_eq | |
[class_instances] (5) ?x_151 : field V := @linear_ordered_field.to_field ?x_152 ?x_153 | |
[class_instances] (6) ?x_153 : linear_ordered_field V := real.linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_153 : linear_ordered_field V := rat.linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_153 : linear_ordered_field V := @discrete_linear_ordered_field.to_linear_ordered_field ?x_154 ?x_155 | |
[class_instances] (7) ?x_155 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (7) ?x_155 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_151 : field V := @discrete_field.to_field ?x_152 ?x_153 | |
[class_instances] (6) ?x_153 : discrete_field V := complex.discrete_field | |
failed is_def_eq | |
[class_instances] (6) ?x_153 : discrete_field V := @local_ring.residue_field.discrete_field ?x_154 ?x_155 | |
failed is_def_eq | |
[class_instances] (6) ?x_153 : discrete_field V := real.discrete_field | |
failed is_def_eq | |
[class_instances] (6) ?x_153 : discrete_field V := rat.discrete_field | |
failed is_def_eq | |
[class_instances] (6) ?x_153 : discrete_field V := @discrete_linear_ordered_field.to_discrete_field ?x_156 ?x_157 | |
[class_instances] (7) ?x_157 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (7) ?x_157 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_153 : discrete_field V := @normed_field.to_discrete_field ?x_154 ?x_155 | |
[class_instances] (7) ?x_155 : normed_field V := _inst_1 | |
failed is_def_eq | |
[class_instances] (7) ?x_155 : normed_field V := rat.normed_field | |
failed is_def_eq | |
[class_instances] (7) ?x_155 : normed_field V := normed_field.normed_field | |
failed is_def_eq | |
[class_instances] (7) ?x_155 : normed_field V := @nondiscrete_normed_field.to_normed_field ?x_156 ?x_157 | |
[class_instances] (8) ?x_157 : nondiscrete_normed_field V := rat.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (8) ?x_157 : nondiscrete_normed_field V := normed_field.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (4) ?x_149 : integral_domain V := @discrete_field.to_integral_domain ?x_150 ?x_151 ?x_152 | |
[class_instances] (5) ?x_151 : discrete_field V := complex.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_151 : discrete_field V := @local_ring.residue_field.discrete_field ?x_153 ?x_154 | |
failed is_def_eq | |
[class_instances] (5) ?x_151 : discrete_field V := real.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_151 : discrete_field V := rat.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_151 : discrete_field V := @discrete_linear_ordered_field.to_discrete_field ?x_155 ?x_156 | |
[class_instances] (6) ?x_156 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_156 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_151 : discrete_field V := @normed_field.to_discrete_field ?x_153 ?x_154 | |
[class_instances] (6) ?x_154 : normed_field V := _inst_1 | |
failed is_def_eq | |
[class_instances] (6) ?x_154 : normed_field V := rat.normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_154 : normed_field V := normed_field.normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_154 : normed_field V := @nondiscrete_normed_field.to_normed_field ?x_155 ?x_156 | |
[class_instances] (7) ?x_156 : nondiscrete_normed_field V := rat.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (7) ?x_156 : nondiscrete_normed_field V := normed_field.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (4) ?x_149 : integral_domain V := @linear_ordered_comm_ring.to_integral_domain ?x_150 ?x_151 | |
[class_instances] (5) ?x_151 : linear_ordered_comm_ring V := real.linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (5) ?x_151 : linear_ordered_comm_ring V := rat.linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (5) ?x_151 : linear_ordered_comm_ring V := @decidable_linear_ordered_comm_ring.to_linear_ordered_comm_ring ?x_152 ?x_153 | |
[class_instances] (6) ?x_153 : decidable_linear_ordered_comm_ring V := real.decidable_linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (6) ?x_153 : decidable_linear_ordered_comm_ring V := rat.decidable_linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (6) ?x_153 : decidable_linear_ordered_comm_ring V := int.decidable_linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (6) ?x_153 : decidable_linear_ordered_comm_ring V := @discrete_linear_ordered_field.to_decidable_linear_ordered_comm_ring ?x_154 ?x_155 | |
[class_instances] (7) ?x_155 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (7) ?x_155 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_153 : decidable_linear_ordered_comm_ring V := @linear_nonneg_ring.to_decidable_linear_ordered_comm_ring ?x_154 ?x_155 ?x_156 ?x_157 | |
[class_instances] (2) ?x_90 : comm_ring V := @field.to_comm_ring ?x_91 ?x_92 | |
[class_instances] (3) ?x_92 : field V := real.field | |
failed is_def_eq | |
[class_instances] (3) ?x_92 : field V := rat.field | |
failed is_def_eq | |
[class_instances] (3) ?x_92 : field V := @linear_ordered_field.to_field ?x_93 ?x_94 | |
[class_instances] (4) ?x_94 : linear_ordered_field V := real.linear_ordered_field | |
failed is_def_eq | |
[class_instances] (4) ?x_94 : linear_ordered_field V := rat.linear_ordered_field | |
failed is_def_eq | |
[class_instances] (4) ?x_94 : linear_ordered_field V := @discrete_linear_ordered_field.to_linear_ordered_field ?x_95 ?x_96 | |
[class_instances] (5) ?x_96 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_96 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (3) ?x_92 : field V := @discrete_field.to_field ?x_93 ?x_94 | |
[class_instances] (4) ?x_94 : discrete_field V := complex.discrete_field | |
failed is_def_eq | |
[class_instances] (4) ?x_94 : discrete_field V := @local_ring.residue_field.discrete_field ?x_95 ?x_96 | |
failed is_def_eq | |
[class_instances] (4) ?x_94 : discrete_field V := real.discrete_field | |
failed is_def_eq | |
[class_instances] (4) ?x_94 : discrete_field V := rat.discrete_field | |
failed is_def_eq | |
[class_instances] (4) ?x_94 : discrete_field V := @discrete_linear_ordered_field.to_discrete_field ?x_97 ?x_98 | |
[class_instances] (5) ?x_98 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_98 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (4) ?x_94 : discrete_field V := @normed_field.to_discrete_field ?x_95 ?x_96 | |
[class_instances] (5) ?x_96 : normed_field V := _inst_1 | |
failed is_def_eq | |
[class_instances] (5) ?x_96 : normed_field V := rat.normed_field | |
failed is_def_eq | |
[class_instances] (5) ?x_96 : normed_field V := normed_field.normed_field | |
failed is_def_eq | |
[class_instances] (5) ?x_96 : normed_field V := @nondiscrete_normed_field.to_normed_field ?x_97 ?x_98 | |
[class_instances] (6) ?x_98 : nondiscrete_normed_field V := rat.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_98 : nondiscrete_normed_field V := normed_field.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (2) ?x_90 : comm_ring V := @integral_domain.to_comm_ring ?x_91 ?x_92 | |
[class_instances] (3) ?x_92 : integral_domain V := @polynomial.integral_domain ?x_93 ?x_94 | |
failed is_def_eq | |
[class_instances] (3) ?x_92 : integral_domain V := @ideal.quotient.integral_domain ?x_95 ?x_96 ?x_97 ?x_98 | |
failed is_def_eq | |
[class_instances] (3) ?x_92 : integral_domain V := real.integral_domain | |
failed is_def_eq | |
[class_instances] (3) ?x_92 : integral_domain V := @subring.domain ?x_99 ?x_100 ?x_101 ?x_102 | |
failed is_def_eq | |
[class_instances] (3) ?x_92 : integral_domain V := rat.integral_domain | |
failed is_def_eq | |
[class_instances] (3) ?x_92 : integral_domain V := @euclidean_domain.integral_domain ?x_103 ?x_104 | |
[class_instances] (4) ?x_104 : euclidean_domain V := @polynomial.euclidean_domain ?x_105 ?x_106 | |
failed is_def_eq | |
[class_instances] (4) ?x_104 : euclidean_domain V := int.euclidean_domain | |
failed is_def_eq | |
[class_instances] (4) ?x_104 : euclidean_domain V := @discrete_field.to_euclidean_domain ?x_107 ?x_108 | |
[class_instances] (5) ?x_108 : discrete_field V := complex.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_108 : discrete_field V := @local_ring.residue_field.discrete_field ?x_109 ?x_110 | |
failed is_def_eq | |
[class_instances] (5) ?x_108 : discrete_field V := real.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_108 : discrete_field V := rat.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_108 : discrete_field V := @discrete_linear_ordered_field.to_discrete_field ?x_111 ?x_112 | |
[class_instances] (6) ?x_112 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_112 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_108 : discrete_field V := @normed_field.to_discrete_field ?x_109 ?x_110 | |
[class_instances] (6) ?x_110 : normed_field V := _inst_1 | |
failed is_def_eq | |
[class_instances] (6) ?x_110 : normed_field V := rat.normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_110 : normed_field V := normed_field.normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_110 : normed_field V := @nondiscrete_normed_field.to_normed_field ?x_111 ?x_112 | |
[class_instances] (7) ?x_112 : nondiscrete_normed_field V := rat.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (7) ?x_112 : nondiscrete_normed_field V := normed_field.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (3) ?x_92 : integral_domain V := @normalization_domain.to_integral_domain ?x_93 ?x_94 | |
[class_instances] (4) ?x_94 : normalization_domain V := @polynomial.normalization_domain ?x_95 ?x_96 | |
failed is_def_eq | |
[class_instances] (4) ?x_94 : normalization_domain V := int.normalization_domain | |
failed is_def_eq | |
[class_instances] (4) ?x_94 : normalization_domain V := @gcd_domain.to_normalization_domain ?x_97 ?x_98 | |
[class_instances] (5) ?x_98 : gcd_domain V := int.gcd_domain | |
failed is_def_eq | |
[class_instances] (3) ?x_92 : integral_domain V := @field.to_integral_domain ?x_93 ?x_94 | |
[class_instances] (4) ?x_94 : field V := real.field | |
failed is_def_eq | |
[class_instances] (4) ?x_94 : field V := rat.field | |
failed is_def_eq | |
[class_instances] (4) ?x_94 : field V := @linear_ordered_field.to_field ?x_95 ?x_96 | |
[class_instances] (5) ?x_96 : linear_ordered_field V := real.linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_96 : linear_ordered_field V := rat.linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_96 : linear_ordered_field V := @discrete_linear_ordered_field.to_linear_ordered_field ?x_97 ?x_98 | |
[class_instances] (6) ?x_98 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_98 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (4) ?x_94 : field V := @discrete_field.to_field ?x_95 ?x_96 | |
[class_instances] (5) ?x_96 : discrete_field V := complex.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_96 : discrete_field V := @local_ring.residue_field.discrete_field ?x_97 ?x_98 | |
failed is_def_eq | |
[class_instances] (5) ?x_96 : discrete_field V := real.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_96 : discrete_field V := rat.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_96 : discrete_field V := @discrete_linear_ordered_field.to_discrete_field ?x_99 ?x_100 | |
[class_instances] (6) ?x_100 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_100 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_96 : discrete_field V := @normed_field.to_discrete_field ?x_97 ?x_98 | |
[class_instances] (6) ?x_98 : normed_field V := _inst_1 | |
failed is_def_eq | |
[class_instances] (6) ?x_98 : normed_field V := rat.normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_98 : normed_field V := normed_field.normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_98 : normed_field V := @nondiscrete_normed_field.to_normed_field ?x_99 ?x_100 | |
[class_instances] (7) ?x_100 : nondiscrete_normed_field V := rat.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (7) ?x_100 : nondiscrete_normed_field V := normed_field.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (3) ?x_92 : integral_domain V := @discrete_field.to_integral_domain ?x_93 ?x_94 ?x_95 | |
[class_instances] (4) ?x_94 : discrete_field V := complex.discrete_field | |
failed is_def_eq | |
[class_instances] (4) ?x_94 : discrete_field V := @local_ring.residue_field.discrete_field ?x_96 ?x_97 | |
failed is_def_eq | |
[class_instances] (4) ?x_94 : discrete_field V := real.discrete_field | |
failed is_def_eq | |
[class_instances] (4) ?x_94 : discrete_field V := rat.discrete_field | |
failed is_def_eq | |
[class_instances] (4) ?x_94 : discrete_field V := @discrete_linear_ordered_field.to_discrete_field ?x_98 ?x_99 | |
[class_instances] (5) ?x_99 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_99 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (4) ?x_94 : discrete_field V := @normed_field.to_discrete_field ?x_96 ?x_97 | |
[class_instances] (5) ?x_97 : normed_field V := _inst_1 | |
failed is_def_eq | |
[class_instances] (5) ?x_97 : normed_field V := rat.normed_field | |
failed is_def_eq | |
[class_instances] (5) ?x_97 : normed_field V := normed_field.normed_field | |
failed is_def_eq | |
[class_instances] (5) ?x_97 : normed_field V := @nondiscrete_normed_field.to_normed_field ?x_98 ?x_99 | |
[class_instances] (6) ?x_99 : nondiscrete_normed_field V := rat.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_99 : nondiscrete_normed_field V := normed_field.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (3) ?x_92 : integral_domain V := @linear_ordered_comm_ring.to_integral_domain ?x_93 ?x_94 | |
[class_instances] (4) ?x_94 : linear_ordered_comm_ring V := real.linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (4) ?x_94 : linear_ordered_comm_ring V := rat.linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (4) ?x_94 : linear_ordered_comm_ring V := @decidable_linear_ordered_comm_ring.to_linear_ordered_comm_ring ?x_95 ?x_96 | |
[class_instances] (5) ?x_96 : decidable_linear_ordered_comm_ring V := real.decidable_linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (5) ?x_96 : decidable_linear_ordered_comm_ring V := rat.decidable_linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (5) ?x_96 : decidable_linear_ordered_comm_ring V := int.decidable_linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (5) ?x_96 : decidable_linear_ordered_comm_ring V := @discrete_linear_ordered_field.to_decidable_linear_ordered_comm_ring ?x_97 ?x_98 | |
[class_instances] (6) ?x_98 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_98 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_96 : decidable_linear_ordered_comm_ring V := @linear_nonneg_ring.to_decidable_linear_ordered_comm_ring ?x_97 ?x_98 ?x_99 ?x_100 | |
[class_instances] (5) ?x_88 : normed_field k := rat.normed_field | |
failed is_def_eq | |
[class_instances] (5) ?x_88 : normed_field k := normed_field.normed_field | |
failed is_def_eq | |
[class_instances] (5) ?x_88 : normed_field k := @nondiscrete_normed_field.to_normed_field ?x_89 ?x_90 | |
[class_instances] (6) ?x_90 : nondiscrete_normed_field k := rat.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_90 : nondiscrete_normed_field k := normed_field.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (2) ?x_82 : nonzero_comm_ring k := @integral_domain.to_nonzero_comm_ring ?x_83 ?x_84 | |
[class_instances] (3) ?x_84 : integral_domain k := @polynomial.integral_domain ?x_85 ?x_86 | |
failed is_def_eq | |
[class_instances] (3) ?x_84 : integral_domain k := @ideal.quotient.integral_domain ?x_87 ?x_88 ?x_89 ?x_90 | |
failed is_def_eq | |
[class_instances] (3) ?x_84 : integral_domain k := real.integral_domain | |
failed is_def_eq | |
[class_instances] (3) ?x_84 : integral_domain k := @subring.domain ?x_91 ?x_92 ?x_93 ?x_94 | |
failed is_def_eq | |
[class_instances] (3) ?x_84 : integral_domain k := rat.integral_domain | |
failed is_def_eq | |
[class_instances] (3) ?x_84 : integral_domain k := @euclidean_domain.integral_domain ?x_95 ?x_96 | |
[class_instances] (4) ?x_96 : euclidean_domain k := @polynomial.euclidean_domain ?x_97 ?x_98 | |
failed is_def_eq | |
[class_instances] (4) ?x_96 : euclidean_domain k := int.euclidean_domain | |
failed is_def_eq | |
[class_instances] (4) ?x_96 : euclidean_domain k := @discrete_field.to_euclidean_domain ?x_99 ?x_100 | |
[class_instances] (5) ?x_100 : discrete_field k := complex.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_100 : discrete_field k := @local_ring.residue_field.discrete_field ?x_101 ?x_102 | |
failed is_def_eq | |
[class_instances] (5) ?x_100 : discrete_field k := real.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_100 : discrete_field k := rat.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_100 : discrete_field k := @discrete_linear_ordered_field.to_discrete_field ?x_103 ?x_104 | |
[class_instances] (6) ?x_104 : discrete_linear_ordered_field k := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_104 : discrete_linear_ordered_field k := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_100 : discrete_field k := @normed_field.to_discrete_field ?x_101 ?x_102 | |
[class_instances] (6) ?x_102 : normed_field k := _inst_1 | |
[class_instances] (1) ?x_24 : ring V := @continuous_linear_map.ring ?x_103 ?x_104 ?x_105 ?x_106 ?x_107 ?x_108 ?x_109 | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := @subalgebra.ring ?x_110 ?x_111 ?x_112 ?x_113 ?x_114 ?x_115 | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := @algebra.comap.ring ?x_116 ?x_117 ?x_118 ?x_119 ?x_120 ?x_121 ?x_122 ?x_123 | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := @free_abelian_group.ring ?x_124 ?x_125 | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := @matrix.ring ?x_126 ?x_127 ?x_128 ?x_129 ?x_130 | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := @mv_polynomial.ring ?x_131 ?x_132 ?x_133 | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := real.ring | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := @cau_seq.ring ?x_134 ?x_135 ?x_136 ?x_137 ?x_138 ?x_139 | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := @linear_map.endomorphism_ring ?x_140 ?x_141 ?x_142 ?x_143 ?x_144 | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := @finsupp.ring ?x_145 ?x_146 ?x_147 ?x_148 | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := @prod.ring ?x_149 ?x_150 ?x_151 ?x_152 | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := @pi.ring ?x_153 ?x_154 ?x_155 | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := @subtype.ring ?x_156 ?x_157 ?x_158 ?x_159 | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := @subset.ring ?x_160 ?x_161 ?x_162 ?x_163 | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := int.ring | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := @normed_ring.to_ring ?x_164 ?x_165 | |
[class_instances] (2) ?x_165 : normed_ring V := int.normed_ring | |
failed is_def_eq | |
[class_instances] (2) ?x_165 : normed_ring V := @prod.normed_ring ?x_166 ?x_167 ?x_168 ?x_169 | |
failed is_def_eq | |
[class_instances] (2) ?x_165 : normed_ring V := @normed_field.to_normed_ring ?x_170 ?x_171 | |
[class_instances] (3) ?x_171 : normed_field V := _inst_1 | |
failed is_def_eq | |
[class_instances] (3) ?x_171 : normed_field V := rat.normed_field | |
failed is_def_eq | |
[class_instances] (3) ?x_171 : normed_field V := normed_field.normed_field | |
failed is_def_eq | |
[class_instances] (3) ?x_171 : normed_field V := @nondiscrete_normed_field.to_normed_field ?x_172 ?x_173 | |
[class_instances] (4) ?x_173 : nondiscrete_normed_field V := rat.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (4) ?x_173 : nondiscrete_normed_field V := normed_field.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := @nonneg_ring.to_ring ?x_103 ?x_104 | |
[class_instances] (2) ?x_104 : nonneg_ring V := @linear_nonneg_ring.to_nonneg_ring ?x_105 ?x_106 | |
[class_instances] (1) ?x_24 : ring V := @domain.to_ring ?x_103 ?x_104 | |
[class_instances] (2) ?x_104 : domain V := real.domain | |
failed is_def_eq | |
[class_instances] (2) ?x_104 : domain V := @division_ring.to_domain ?x_105 ?x_106 | |
[class_instances] (3) ?x_106 : division_ring V := real.division_ring | |
failed is_def_eq | |
[class_instances] (3) ?x_106 : division_ring V := rat.division_ring | |
failed is_def_eq | |
[class_instances] (3) ?x_106 : division_ring V := @field.to_division_ring ?x_107 ?x_108 | |
[class_instances] (4) ?x_108 : field V := real.field | |
failed is_def_eq | |
[class_instances] (4) ?x_108 : field V := rat.field | |
failed is_def_eq | |
[class_instances] (4) ?x_108 : field V := @linear_ordered_field.to_field ?x_109 ?x_110 | |
[class_instances] (5) ?x_110 : linear_ordered_field V := real.linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_110 : linear_ordered_field V := rat.linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_110 : linear_ordered_field V := @discrete_linear_ordered_field.to_linear_ordered_field ?x_111 ?x_112 | |
[class_instances] (6) ?x_112 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_112 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (4) ?x_108 : field V := @discrete_field.to_field ?x_109 ?x_110 | |
[class_instances] (5) ?x_110 : discrete_field V := complex.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_110 : discrete_field V := @local_ring.residue_field.discrete_field ?x_111 ?x_112 | |
failed is_def_eq | |
[class_instances] (5) ?x_110 : discrete_field V := real.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_110 : discrete_field V := rat.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_110 : discrete_field V := @discrete_linear_ordered_field.to_discrete_field ?x_113 ?x_114 | |
[class_instances] (6) ?x_114 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_114 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_110 : discrete_field V := @normed_field.to_discrete_field ?x_111 ?x_112 | |
[class_instances] (6) ?x_112 : normed_field V := _inst_1 | |
failed is_def_eq | |
[class_instances] (6) ?x_112 : normed_field V := rat.normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_112 : normed_field V := normed_field.normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_112 : normed_field V := @nondiscrete_normed_field.to_normed_field ?x_113 ?x_114 | |
[class_instances] (7) ?x_114 : nondiscrete_normed_field V := rat.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (7) ?x_114 : nondiscrete_normed_field V := normed_field.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (2) ?x_104 : domain V := @linear_nonneg_ring.to_domain ?x_105 ?x_106 | |
[class_instances] (2) ?x_104 : domain V := @linear_ordered_ring.to_domain ?x_105 ?x_106 | |
[class_instances] (3) ?x_106 : linear_ordered_ring V := real.linear_ordered_ring | |
failed is_def_eq | |
[class_instances] (3) ?x_106 : linear_ordered_ring V := rat.linear_ordered_ring | |
failed is_def_eq | |
[class_instances] (3) ?x_106 : linear_ordered_ring V := @linear_ordered_field.to_linear_ordered_ring ?x_107 ?x_108 | |
[class_instances] (4) ?x_108 : linear_ordered_field V := real.linear_ordered_field | |
failed is_def_eq | |
[class_instances] (4) ?x_108 : linear_ordered_field V := rat.linear_ordered_field | |
failed is_def_eq | |
[class_instances] (4) ?x_108 : linear_ordered_field V := @discrete_linear_ordered_field.to_linear_ordered_field ?x_109 ?x_110 | |
[class_instances] (5) ?x_110 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_110 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (3) ?x_106 : linear_ordered_ring V := @linear_nonneg_ring.to_linear_ordered_ring ?x_107 ?x_108 | |
[class_instances] (3) ?x_106 : linear_ordered_ring V := @linear_ordered_comm_ring.to_linear_ordered_ring ?x_107 ?x_108 | |
[class_instances] (4) ?x_108 : linear_ordered_comm_ring V := real.linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (4) ?x_108 : linear_ordered_comm_ring V := rat.linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (4) ?x_108 : linear_ordered_comm_ring V := @decidable_linear_ordered_comm_ring.to_linear_ordered_comm_ring ?x_109 ?x_110 | |
[class_instances] (5) ?x_110 : decidable_linear_ordered_comm_ring V := real.decidable_linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (5) ?x_110 : decidable_linear_ordered_comm_ring V := rat.decidable_linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (5) ?x_110 : decidable_linear_ordered_comm_ring V := int.decidable_linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (5) ?x_110 : decidable_linear_ordered_comm_ring V := @discrete_linear_ordered_field.to_decidable_linear_ordered_comm_ring ?x_111 ?x_112 | |
[class_instances] (6) ?x_112 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_112 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_110 : decidable_linear_ordered_comm_ring V := @linear_nonneg_ring.to_decidable_linear_ordered_comm_ring ?x_111 ?x_112 ?x_113 ?x_114 | |
[class_instances] (2) ?x_104 : domain V := @integral_domain.to_domain ?x_105 ?x_106 | |
[class_instances] (3) ?x_106 : integral_domain V := @polynomial.integral_domain ?x_107 ?x_108 | |
failed is_def_eq | |
[class_instances] (3) ?x_106 : integral_domain V := @ideal.quotient.integral_domain ?x_109 ?x_110 ?x_111 ?x_112 | |
failed is_def_eq | |
[class_instances] (3) ?x_106 : integral_domain V := real.integral_domain | |
failed is_def_eq | |
[class_instances] (3) ?x_106 : integral_domain V := @subring.domain ?x_113 ?x_114 ?x_115 ?x_116 | |
failed is_def_eq | |
[class_instances] (3) ?x_106 : integral_domain V := rat.integral_domain | |
failed is_def_eq | |
[class_instances] (3) ?x_106 : integral_domain V := @euclidean_domain.integral_domain ?x_117 ?x_118 | |
[class_instances] (4) ?x_118 : euclidean_domain V := @polynomial.euclidean_domain ?x_119 ?x_120 | |
failed is_def_eq | |
[class_instances] (4) ?x_118 : euclidean_domain V := int.euclidean_domain | |
failed is_def_eq | |
[class_instances] (4) ?x_118 : euclidean_domain V := @discrete_field.to_euclidean_domain ?x_121 ?x_122 | |
[class_instances] (5) ?x_122 : discrete_field V := complex.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_122 : discrete_field V := @local_ring.residue_field.discrete_field ?x_123 ?x_124 | |
failed is_def_eq | |
[class_instances] (5) ?x_122 : discrete_field V := real.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_122 : discrete_field V := rat.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_122 : discrete_field V := @discrete_linear_ordered_field.to_discrete_field ?x_125 ?x_126 | |
[class_instances] (6) ?x_126 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_126 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_122 : discrete_field V := @normed_field.to_discrete_field ?x_123 ?x_124 | |
[class_instances] (6) ?x_124 : normed_field V := _inst_1 | |
failed is_def_eq | |
[class_instances] (6) ?x_124 : normed_field V := rat.normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_124 : normed_field V := normed_field.normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_124 : normed_field V := @nondiscrete_normed_field.to_normed_field ?x_125 ?x_126 | |
[class_instances] (7) ?x_126 : nondiscrete_normed_field V := rat.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (7) ?x_126 : nondiscrete_normed_field V := normed_field.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (3) ?x_106 : integral_domain V := @normalization_domain.to_integral_domain ?x_107 ?x_108 | |
[class_instances] (4) ?x_108 : normalization_domain V := @polynomial.normalization_domain ?x_109 ?x_110 | |
failed is_def_eq | |
[class_instances] (4) ?x_108 : normalization_domain V := int.normalization_domain | |
failed is_def_eq | |
[class_instances] (4) ?x_108 : normalization_domain V := @gcd_domain.to_normalization_domain ?x_111 ?x_112 | |
[class_instances] (5) ?x_112 : gcd_domain V := int.gcd_domain | |
failed is_def_eq | |
[class_instances] (3) ?x_106 : integral_domain V := @field.to_integral_domain ?x_107 ?x_108 | |
[class_instances] (4) ?x_108 : field V := real.field | |
failed is_def_eq | |
[class_instances] (4) ?x_108 : field V := rat.field | |
failed is_def_eq | |
[class_instances] (4) ?x_108 : field V := @linear_ordered_field.to_field ?x_109 ?x_110 | |
[class_instances] (5) ?x_110 : linear_ordered_field V := real.linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_110 : linear_ordered_field V := rat.linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_110 : linear_ordered_field V := @discrete_linear_ordered_field.to_linear_ordered_field ?x_111 ?x_112 | |
[class_instances] (6) ?x_112 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_112 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (4) ?x_108 : field V := @discrete_field.to_field ?x_109 ?x_110 | |
[class_instances] (5) ?x_110 : discrete_field V := complex.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_110 : discrete_field V := @local_ring.residue_field.discrete_field ?x_111 ?x_112 | |
failed is_def_eq | |
[class_instances] (5) ?x_110 : discrete_field V := real.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_110 : discrete_field V := rat.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_110 : discrete_field V := @discrete_linear_ordered_field.to_discrete_field ?x_113 ?x_114 | |
[class_instances] (6) ?x_114 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_114 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_110 : discrete_field V := @normed_field.to_discrete_field ?x_111 ?x_112 | |
[class_instances] (6) ?x_112 : normed_field V := _inst_1 | |
failed is_def_eq | |
[class_instances] (6) ?x_112 : normed_field V := rat.normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_112 : normed_field V := normed_field.normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_112 : normed_field V := @nondiscrete_normed_field.to_normed_field ?x_113 ?x_114 | |
[class_instances] (7) ?x_114 : nondiscrete_normed_field V := rat.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (7) ?x_114 : nondiscrete_normed_field V := normed_field.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (3) ?x_106 : integral_domain V := @discrete_field.to_integral_domain ?x_107 ?x_108 ?x_109 | |
[class_instances] (4) ?x_108 : discrete_field V := complex.discrete_field | |
failed is_def_eq | |
[class_instances] (4) ?x_108 : discrete_field V := @local_ring.residue_field.discrete_field ?x_110 ?x_111 | |
failed is_def_eq | |
[class_instances] (4) ?x_108 : discrete_field V := real.discrete_field | |
failed is_def_eq | |
[class_instances] (4) ?x_108 : discrete_field V := rat.discrete_field | |
failed is_def_eq | |
[class_instances] (4) ?x_108 : discrete_field V := @discrete_linear_ordered_field.to_discrete_field ?x_112 ?x_113 | |
[class_instances] (5) ?x_113 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_113 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (4) ?x_108 : discrete_field V := @normed_field.to_discrete_field ?x_110 ?x_111 | |
[class_instances] (5) ?x_111 : normed_field V := _inst_1 | |
failed is_def_eq | |
[class_instances] (5) ?x_111 : normed_field V := rat.normed_field | |
failed is_def_eq | |
[class_instances] (5) ?x_111 : normed_field V := normed_field.normed_field | |
failed is_def_eq | |
[class_instances] (5) ?x_111 : normed_field V := @nondiscrete_normed_field.to_normed_field ?x_112 ?x_113 | |
[class_instances] (6) ?x_113 : nondiscrete_normed_field V := rat.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_113 : nondiscrete_normed_field V := normed_field.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (3) ?x_106 : integral_domain V := @linear_ordered_comm_ring.to_integral_domain ?x_107 ?x_108 | |
[class_instances] (4) ?x_108 : linear_ordered_comm_ring V := real.linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (4) ?x_108 : linear_ordered_comm_ring V := rat.linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (4) ?x_108 : linear_ordered_comm_ring V := @decidable_linear_ordered_comm_ring.to_linear_ordered_comm_ring ?x_109 ?x_110 | |
[class_instances] (5) ?x_110 : decidable_linear_ordered_comm_ring V := real.decidable_linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (5) ?x_110 : decidable_linear_ordered_comm_ring V := rat.decidable_linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (5) ?x_110 : decidable_linear_ordered_comm_ring V := int.decidable_linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (5) ?x_110 : decidable_linear_ordered_comm_ring V := @discrete_linear_ordered_field.to_decidable_linear_ordered_comm_ring ?x_111 ?x_112 | |
[class_instances] (6) ?x_112 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_112 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_110 : decidable_linear_ordered_comm_ring V := @linear_nonneg_ring.to_decidable_linear_ordered_comm_ring ?x_111 ?x_112 ?x_113 ?x_114 | |
[class_instances] (1) ?x_24 : ring V := @division_ring.to_ring ?x_103 ?x_104 | |
[class_instances] (2) ?x_104 : division_ring V := real.division_ring | |
failed is_def_eq | |
[class_instances] (2) ?x_104 : division_ring V := rat.division_ring | |
failed is_def_eq | |
[class_instances] (2) ?x_104 : division_ring V := @field.to_division_ring ?x_105 ?x_106 | |
[class_instances] (3) ?x_106 : field V := real.field | |
failed is_def_eq | |
[class_instances] (3) ?x_106 : field V := rat.field | |
failed is_def_eq | |
[class_instances] (3) ?x_106 : field V := @linear_ordered_field.to_field ?x_107 ?x_108 | |
[class_instances] (4) ?x_108 : linear_ordered_field V := real.linear_ordered_field | |
failed is_def_eq | |
[class_instances] (4) ?x_108 : linear_ordered_field V := rat.linear_ordered_field | |
failed is_def_eq | |
[class_instances] (4) ?x_108 : linear_ordered_field V := @discrete_linear_ordered_field.to_linear_ordered_field ?x_109 ?x_110 | |
[class_instances] (5) ?x_110 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_110 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (3) ?x_106 : field V := @discrete_field.to_field ?x_107 ?x_108 | |
[class_instances] (4) ?x_108 : discrete_field V := complex.discrete_field | |
failed is_def_eq | |
[class_instances] (4) ?x_108 : discrete_field V := @local_ring.residue_field.discrete_field ?x_109 ?x_110 | |
failed is_def_eq | |
[class_instances] (4) ?x_108 : discrete_field V := real.discrete_field | |
failed is_def_eq | |
[class_instances] (4) ?x_108 : discrete_field V := rat.discrete_field | |
failed is_def_eq | |
[class_instances] (4) ?x_108 : discrete_field V := @discrete_linear_ordered_field.to_discrete_field ?x_111 ?x_112 | |
[class_instances] (5) ?x_112 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_112 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (4) ?x_108 : discrete_field V := @normed_field.to_discrete_field ?x_109 ?x_110 | |
[class_instances] (5) ?x_110 : normed_field V := _inst_1 | |
failed is_def_eq | |
[class_instances] (5) ?x_110 : normed_field V := rat.normed_field | |
failed is_def_eq | |
[class_instances] (5) ?x_110 : normed_field V := normed_field.normed_field | |
failed is_def_eq | |
[class_instances] (5) ?x_110 : normed_field V := @nondiscrete_normed_field.to_normed_field ?x_111 ?x_112 | |
[class_instances] (6) ?x_112 : nondiscrete_normed_field V := rat.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_112 : nondiscrete_normed_field V := normed_field.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := @ordered_ring.to_ring ?x_103 ?x_104 | |
[class_instances] (2) ?x_104 : ordered_ring V := real.ordered_ring | |
failed is_def_eq | |
[class_instances] (2) ?x_104 : ordered_ring V := rat.ordered_ring | |
failed is_def_eq | |
[class_instances] (2) ?x_104 : ordered_ring V := @nonneg_ring.to_ordered_ring ?x_105 ?x_106 | |
[class_instances] (3) ?x_106 : nonneg_ring V := @linear_nonneg_ring.to_nonneg_ring ?x_107 ?x_108 | |
[class_instances] (2) ?x_104 : ordered_ring V := @linear_ordered_ring.to_ordered_ring ?x_105 ?x_106 | |
[class_instances] (3) ?x_106 : linear_ordered_ring V := real.linear_ordered_ring | |
failed is_def_eq | |
[class_instances] (3) ?x_106 : linear_ordered_ring V := rat.linear_ordered_ring | |
failed is_def_eq | |
[class_instances] (3) ?x_106 : linear_ordered_ring V := @linear_ordered_field.to_linear_ordered_ring ?x_107 ?x_108 | |
[class_instances] (4) ?x_108 : linear_ordered_field V := real.linear_ordered_field | |
failed is_def_eq | |
[class_instances] (4) ?x_108 : linear_ordered_field V := rat.linear_ordered_field | |
failed is_def_eq | |
[class_instances] (4) ?x_108 : linear_ordered_field V := @discrete_linear_ordered_field.to_linear_ordered_field ?x_109 ?x_110 | |
[class_instances] (5) ?x_110 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_110 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (3) ?x_106 : linear_ordered_ring V := @linear_nonneg_ring.to_linear_ordered_ring ?x_107 ?x_108 | |
[class_instances] (3) ?x_106 : linear_ordered_ring V := @linear_ordered_comm_ring.to_linear_ordered_ring ?x_107 ?x_108 | |
[class_instances] (4) ?x_108 : linear_ordered_comm_ring V := real.linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (4) ?x_108 : linear_ordered_comm_ring V := rat.linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (4) ?x_108 : linear_ordered_comm_ring V := @decidable_linear_ordered_comm_ring.to_linear_ordered_comm_ring ?x_109 ?x_110 | |
[class_instances] (5) ?x_110 : decidable_linear_ordered_comm_ring V := real.decidable_linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (5) ?x_110 : decidable_linear_ordered_comm_ring V := rat.decidable_linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (5) ?x_110 : decidable_linear_ordered_comm_ring V := int.decidable_linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (5) ?x_110 : decidable_linear_ordered_comm_ring V := @discrete_linear_ordered_field.to_decidable_linear_ordered_comm_ring ?x_111 ?x_112 | |
[class_instances] (6) ?x_112 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_112 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_110 : decidable_linear_ordered_comm_ring V := @linear_nonneg_ring.to_decidable_linear_ordered_comm_ring ?x_111 ?x_112 ?x_113 ?x_114 | |
[class_instances] (1) ?x_24 : ring V := @comm_ring.to_ring ?x_103 ?x_104 | |
[class_instances] (2) ?x_104 : comm_ring V := @subalgebra.comm_ring ?x_105 ?x_106 ?x_107 ?x_108 ?x_109 ?x_110 | |
failed is_def_eq | |
[class_instances] (2) ?x_104 : comm_ring V := @algebra.comap.comm_ring ?x_111 ?x_112 ?x_113 ?x_114 ?x_115 ?x_116 ?x_117 ?x_118 | |
failed is_def_eq | |
[class_instances] (2) ?x_104 : comm_ring V := @free_abelian_group.comm_ring ?x_119 ?x_120 | |
failed is_def_eq | |
[class_instances] (2) ?x_104 : comm_ring V := @mv_polynomial.comm_ring ?x_121 ?x_122 ?x_123 | |
failed is_def_eq | |
[class_instances] (2) ?x_104 : comm_ring V := @polynomial.comm_ring ?x_124 ?x_125 | |
failed is_def_eq | |
[class_instances] (2) ?x_104 : comm_ring V := complex.comm_ring | |
failed is_def_eq | |
[class_instances] (2) ?x_104 : comm_ring V := @ideal.quotient.comm_ring ?x_126 ?x_127 ?x_128 | |
failed is_def_eq | |
[class_instances] (2) ?x_104 : comm_ring V := real.comm_ring | |
failed is_def_eq | |
[class_instances] (2) ?x_104 : comm_ring V := @cau_seq.completion.comm_ring ?x_129 ?x_130 ?x_131 ?x_132 ?x_133 ?x_134 | |
failed is_def_eq | |
[class_instances] (2) ?x_104 : comm_ring V := @cau_seq.comm_ring ?x_135 ?x_136 ?x_137 ?x_138 ?x_139 ?x_140 | |
failed is_def_eq | |
[class_instances] (2) ?x_104 : comm_ring V := @finsupp.comm_ring ?x_141 ?x_142 ?x_143 ?x_144 | |
failed is_def_eq | |
[class_instances] (2) ?x_104 : comm_ring V := @prod.comm_ring ?x_145 ?x_146 ?x_147 ?x_148 | |
failed is_def_eq | |
[class_instances] (2) ?x_104 : comm_ring V := @pi.comm_ring ?x_149 ?x_150 ?x_151 | |
failed is_def_eq | |
[class_instances] (2) ?x_104 : comm_ring V := @subtype.comm_ring ?x_152 ?x_153 ?x_154 ?x_155 | |
failed is_def_eq | |
[class_instances] (2) ?x_104 : comm_ring V := @subset.comm_ring ?x_156 ?x_157 ?x_158 ?x_159 | |
failed is_def_eq | |
[class_instances] (2) ?x_104 : comm_ring V := rat.comm_ring | |
failed is_def_eq | |
[class_instances] (2) ?x_104 : comm_ring V := int.comm_ring | |
failed is_def_eq | |
[class_instances] (2) ?x_104 : comm_ring V := @nonzero_comm_ring.to_comm_ring ?x_160 ?x_161 | |
[class_instances] (3) ?x_161 : nonzero_comm_ring V := @polynomial.nonzero_comm_ring ?x_162 ?x_163 | |
failed is_def_eq | |
[class_instances] (3) ?x_161 : nonzero_comm_ring V := real.nonzero_comm_ring | |
failed is_def_eq | |
[class_instances] (3) ?x_161 : nonzero_comm_ring V := @prod.nonzero_comm_ring ?x_164 ?x_165 ?x_166 ?x_167 | |
failed is_def_eq | |
[class_instances] (3) ?x_161 : nonzero_comm_ring V := rat.nonzero_comm_ring | |
failed is_def_eq | |
[class_instances] (3) ?x_161 : nonzero_comm_ring V := @euclidean_domain.to_nonzero_comm_ring ?x_168 ?x_169 | |
[class_instances] (4) ?x_169 : euclidean_domain V := @polynomial.euclidean_domain ?x_170 ?x_171 | |
failed is_def_eq | |
[class_instances] (4) ?x_169 : euclidean_domain V := int.euclidean_domain | |
failed is_def_eq | |
[class_instances] (4) ?x_169 : euclidean_domain V := @discrete_field.to_euclidean_domain ?x_172 ?x_173 | |
[class_instances] (5) ?x_173 : discrete_field V := complex.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_173 : discrete_field V := @local_ring.residue_field.discrete_field ?x_174 ?x_175 | |
failed is_def_eq | |
[class_instances] (5) ?x_173 : discrete_field V := real.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_173 : discrete_field V := rat.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_173 : discrete_field V := @discrete_linear_ordered_field.to_discrete_field ?x_176 ?x_177 | |
[class_instances] (6) ?x_177 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_177 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_173 : discrete_field V := @normed_field.to_discrete_field ?x_174 ?x_175 | |
[class_instances] (6) ?x_175 : normed_field V := _inst_1 | |
failed is_def_eq | |
[class_instances] (6) ?x_175 : normed_field V := rat.normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_175 : normed_field V := normed_field.normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_175 : normed_field V := @nondiscrete_normed_field.to_normed_field ?x_176 ?x_177 | |
[class_instances] (7) ?x_177 : nondiscrete_normed_field V := rat.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (7) ?x_177 : nondiscrete_normed_field V := normed_field.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (3) ?x_161 : nonzero_comm_ring V := @local_ring.to_nonzero_comm_ring ?x_162 ?x_163 | |
[class_instances] (4) ?x_163 : local_ring V := @discrete_field.local_ring ?x_164 ?x_165 | |
[class_instances] (5) ?x_165 : discrete_field V := complex.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_165 : discrete_field V := @local_ring.residue_field.discrete_field ?x_166 ?x_167 | |
failed is_def_eq | |
[class_instances] (5) ?x_165 : discrete_field V := real.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_165 : discrete_field V := rat.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_165 : discrete_field V := @discrete_linear_ordered_field.to_discrete_field ?x_168 ?x_169 | |
[class_instances] (6) ?x_169 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_169 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_165 : discrete_field V := @normed_field.to_discrete_field ?x_166 ?x_167 | |
[class_instances] (6) ?x_167 : normed_field V := _inst_1 | |
failed is_def_eq | |
[class_instances] (6) ?x_167 : normed_field V := rat.normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_167 : normed_field V := normed_field.normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_167 : normed_field V := @nondiscrete_normed_field.to_normed_field ?x_168 ?x_169 | |
[class_instances] (7) ?x_169 : nondiscrete_normed_field V := rat.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (7) ?x_169 : nondiscrete_normed_field V := normed_field.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (3) ?x_161 : nonzero_comm_ring V := @integral_domain.to_nonzero_comm_ring ?x_162 ?x_163 | |
[class_instances] (4) ?x_163 : integral_domain V := @polynomial.integral_domain ?x_164 ?x_165 | |
failed is_def_eq | |
[class_instances] (4) ?x_163 : integral_domain V := @ideal.quotient.integral_domain ?x_166 ?x_167 ?x_168 ?x_169 | |
failed is_def_eq | |
[class_instances] (4) ?x_163 : integral_domain V := real.integral_domain | |
failed is_def_eq | |
[class_instances] (4) ?x_163 : integral_domain V := @subring.domain ?x_170 ?x_171 ?x_172 ?x_173 | |
failed is_def_eq | |
[class_instances] (4) ?x_163 : integral_domain V := rat.integral_domain | |
failed is_def_eq | |
[class_instances] (4) ?x_163 : integral_domain V := @euclidean_domain.integral_domain ?x_174 ?x_175 | |
[class_instances] (5) ?x_175 : euclidean_domain V := @polynomial.euclidean_domain ?x_176 ?x_177 | |
failed is_def_eq | |
[class_instances] (5) ?x_175 : euclidean_domain V := int.euclidean_domain | |
failed is_def_eq | |
[class_instances] (5) ?x_175 : euclidean_domain V := @discrete_field.to_euclidean_domain ?x_178 ?x_179 | |
[class_instances] (6) ?x_179 : discrete_field V := complex.discrete_field | |
failed is_def_eq | |
[class_instances] (6) ?x_179 : discrete_field V := @local_ring.residue_field.discrete_field ?x_180 ?x_181 | |
failed is_def_eq | |
[class_instances] (6) ?x_179 : discrete_field V := real.discrete_field | |
failed is_def_eq | |
[class_instances] (6) ?x_179 : discrete_field V := rat.discrete_field | |
failed is_def_eq | |
[class_instances] (6) ?x_179 : discrete_field V := @discrete_linear_ordered_field.to_discrete_field ?x_182 ?x_183 | |
[class_instances] (7) ?x_183 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (7) ?x_183 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_179 : discrete_field V := @normed_field.to_discrete_field ?x_180 ?x_181 | |
[class_instances] (7) ?x_181 : normed_field V := _inst_1 | |
failed is_def_eq | |
[class_instances] (7) ?x_181 : normed_field V := rat.normed_field | |
failed is_def_eq | |
[class_instances] (7) ?x_181 : normed_field V := normed_field.normed_field | |
failed is_def_eq | |
[class_instances] (7) ?x_181 : normed_field V := @nondiscrete_normed_field.to_normed_field ?x_182 ?x_183 | |
[class_instances] (8) ?x_183 : nondiscrete_normed_field V := rat.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (8) ?x_183 : nondiscrete_normed_field V := normed_field.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (4) ?x_163 : integral_domain V := @normalization_domain.to_integral_domain ?x_164 ?x_165 | |
[class_instances] (5) ?x_165 : normalization_domain V := @polynomial.normalization_domain ?x_166 ?x_167 | |
failed is_def_eq | |
[class_instances] (5) ?x_165 : normalization_domain V := int.normalization_domain | |
failed is_def_eq | |
[class_instances] (5) ?x_165 : normalization_domain V := @gcd_domain.to_normalization_domain ?x_168 ?x_169 | |
[class_instances] (6) ?x_169 : gcd_domain V := int.gcd_domain | |
failed is_def_eq | |
[class_instances] (4) ?x_163 : integral_domain V := @field.to_integral_domain ?x_164 ?x_165 | |
[class_instances] (5) ?x_165 : field V := real.field | |
failed is_def_eq | |
[class_instances] (5) ?x_165 : field V := rat.field | |
failed is_def_eq | |
[class_instances] (5) ?x_165 : field V := @linear_ordered_field.to_field ?x_166 ?x_167 | |
[class_instances] (6) ?x_167 : linear_ordered_field V := real.linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_167 : linear_ordered_field V := rat.linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_167 : linear_ordered_field V := @discrete_linear_ordered_field.to_linear_ordered_field ?x_168 ?x_169 | |
[class_instances] (7) ?x_169 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (7) ?x_169 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_165 : field V := @discrete_field.to_field ?x_166 ?x_167 | |
[class_instances] (6) ?x_167 : discrete_field V := complex.discrete_field | |
failed is_def_eq | |
[class_instances] (6) ?x_167 : discrete_field V := @local_ring.residue_field.discrete_field ?x_168 ?x_169 | |
failed is_def_eq | |
[class_instances] (6) ?x_167 : discrete_field V := real.discrete_field | |
failed is_def_eq | |
[class_instances] (6) ?x_167 : discrete_field V := rat.discrete_field | |
failed is_def_eq | |
[class_instances] (6) ?x_167 : discrete_field V := @discrete_linear_ordered_field.to_discrete_field ?x_170 ?x_171 | |
[class_instances] (7) ?x_171 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (7) ?x_171 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_167 : discrete_field V := @normed_field.to_discrete_field ?x_168 ?x_169 | |
[class_instances] (7) ?x_169 : normed_field V := _inst_1 | |
failed is_def_eq | |
[class_instances] (7) ?x_169 : normed_field V := rat.normed_field | |
failed is_def_eq | |
[class_instances] (7) ?x_169 : normed_field V := normed_field.normed_field | |
failed is_def_eq | |
[class_instances] (7) ?x_169 : normed_field V := @nondiscrete_normed_field.to_normed_field ?x_170 ?x_171 | |
[class_instances] (8) ?x_171 : nondiscrete_normed_field V := rat.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (8) ?x_171 : nondiscrete_normed_field V := normed_field.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (4) ?x_163 : integral_domain V := @discrete_field.to_integral_domain ?x_164 ?x_165 ?x_166 | |
[class_instances] (5) ?x_165 : discrete_field V := complex.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_165 : discrete_field V := @local_ring.residue_field.discrete_field ?x_167 ?x_168 | |
failed is_def_eq | |
[class_instances] (5) ?x_165 : discrete_field V := real.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_165 : discrete_field V := rat.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_165 : discrete_field V := @discrete_linear_ordered_field.to_discrete_field ?x_169 ?x_170 | |
[class_instances] (6) ?x_170 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_170 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_165 : discrete_field V := @normed_field.to_discrete_field ?x_167 ?x_168 | |
[class_instances] (6) ?x_168 : normed_field V := _inst_1 | |
failed is_def_eq | |
[class_instances] (6) ?x_168 : normed_field V := rat.normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_168 : normed_field V := normed_field.normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_168 : normed_field V := @nondiscrete_normed_field.to_normed_field ?x_169 ?x_170 | |
[class_instances] (7) ?x_170 : nondiscrete_normed_field V := rat.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (7) ?x_170 : nondiscrete_normed_field V := normed_field.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (4) ?x_163 : integral_domain V := @linear_ordered_comm_ring.to_integral_domain ?x_164 ?x_165 | |
[class_instances] (5) ?x_165 : linear_ordered_comm_ring V := real.linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (5) ?x_165 : linear_ordered_comm_ring V := rat.linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (5) ?x_165 : linear_ordered_comm_ring V := @decidable_linear_ordered_comm_ring.to_linear_ordered_comm_ring ?x_166 ?x_167 | |
[class_instances] (6) ?x_167 : decidable_linear_ordered_comm_ring V := real.decidable_linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (6) ?x_167 : decidable_linear_ordered_comm_ring V := rat.decidable_linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (6) ?x_167 : decidable_linear_ordered_comm_ring V := int.decidable_linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (6) ?x_167 : decidable_linear_ordered_comm_ring V := @discrete_linear_ordered_field.to_decidable_linear_ordered_comm_ring ?x_168 ?x_169 | |
[class_instances] (7) ?x_169 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (7) ?x_169 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_167 : decidable_linear_ordered_comm_ring V := @linear_nonneg_ring.to_decidable_linear_ordered_comm_ring ?x_168 ?x_169 ?x_170 ?x_171 | |
[class_instances] (2) ?x_104 : comm_ring V := @field.to_comm_ring ?x_105 ?x_106 | |
[class_instances] (3) ?x_106 : field V := real.field | |
failed is_def_eq | |
[class_instances] (3) ?x_106 : field V := rat.field | |
failed is_def_eq | |
[class_instances] (3) ?x_106 : field V := @linear_ordered_field.to_field ?x_107 ?x_108 | |
[class_instances] (4) ?x_108 : linear_ordered_field V := real.linear_ordered_field | |
failed is_def_eq | |
[class_instances] (4) ?x_108 : linear_ordered_field V := rat.linear_ordered_field | |
failed is_def_eq | |
[class_instances] (4) ?x_108 : linear_ordered_field V := @discrete_linear_ordered_field.to_linear_ordered_field ?x_109 ?x_110 | |
[class_instances] (5) ?x_110 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_110 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (3) ?x_106 : field V := @discrete_field.to_field ?x_107 ?x_108 | |
[class_instances] (4) ?x_108 : discrete_field V := complex.discrete_field | |
failed is_def_eq | |
[class_instances] (4) ?x_108 : discrete_field V := @local_ring.residue_field.discrete_field ?x_109 ?x_110 | |
failed is_def_eq | |
[class_instances] (4) ?x_108 : discrete_field V := real.discrete_field | |
failed is_def_eq | |
[class_instances] (4) ?x_108 : discrete_field V := rat.discrete_field | |
failed is_def_eq | |
[class_instances] (4) ?x_108 : discrete_field V := @discrete_linear_ordered_field.to_discrete_field ?x_111 ?x_112 | |
[class_instances] (5) ?x_112 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_112 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (4) ?x_108 : discrete_field V := @normed_field.to_discrete_field ?x_109 ?x_110 | |
[class_instances] (5) ?x_110 : normed_field V := _inst_1 | |
failed is_def_eq | |
[class_instances] (5) ?x_110 : normed_field V := rat.normed_field | |
failed is_def_eq | |
[class_instances] (5) ?x_110 : normed_field V := normed_field.normed_field | |
failed is_def_eq | |
[class_instances] (5) ?x_110 : normed_field V := @nondiscrete_normed_field.to_normed_field ?x_111 ?x_112 | |
[class_instances] (6) ?x_112 : nondiscrete_normed_field V := rat.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_112 : nondiscrete_normed_field V := normed_field.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (2) ?x_104 : comm_ring V := @integral_domain.to_comm_ring ?x_105 ?x_106 | |
[class_instances] (3) ?x_106 : integral_domain V := @polynomial.integral_domain ?x_107 ?x_108 | |
failed is_def_eq | |
[class_instances] (3) ?x_106 : integral_domain V := @ideal.quotient.integral_domain ?x_109 ?x_110 ?x_111 ?x_112 | |
failed is_def_eq | |
[class_instances] (3) ?x_106 : integral_domain V := real.integral_domain | |
failed is_def_eq | |
[class_instances] (3) ?x_106 : integral_domain V := @subring.domain ?x_113 ?x_114 ?x_115 ?x_116 | |
failed is_def_eq | |
[class_instances] (3) ?x_106 : integral_domain V := rat.integral_domain | |
failed is_def_eq | |
[class_instances] (3) ?x_106 : integral_domain V := @euclidean_domain.integral_domain ?x_117 ?x_118 | |
[class_instances] (4) ?x_118 : euclidean_domain V := @polynomial.euclidean_domain ?x_119 ?x_120 | |
failed is_def_eq | |
[class_instances] (4) ?x_118 : euclidean_domain V := int.euclidean_domain | |
failed is_def_eq | |
[class_instances] (4) ?x_118 : euclidean_domain V := @discrete_field.to_euclidean_domain ?x_121 ?x_122 | |
[class_instances] (5) ?x_122 : discrete_field V := complex.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_122 : discrete_field V := @local_ring.residue_field.discrete_field ?x_123 ?x_124 | |
failed is_def_eq | |
[class_instances] (5) ?x_122 : discrete_field V := real.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_122 : discrete_field V := rat.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_122 : discrete_field V := @discrete_linear_ordered_field.to_discrete_field ?x_125 ?x_126 | |
[class_instances] (6) ?x_126 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_126 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_122 : discrete_field V := @normed_field.to_discrete_field ?x_123 ?x_124 | |
[class_instances] (6) ?x_124 : normed_field V := _inst_1 | |
failed is_def_eq | |
[class_instances] (6) ?x_124 : normed_field V := rat.normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_124 : normed_field V := normed_field.normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_124 : normed_field V := @nondiscrete_normed_field.to_normed_field ?x_125 ?x_126 | |
[class_instances] (7) ?x_126 : nondiscrete_normed_field V := rat.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (7) ?x_126 : nondiscrete_normed_field V := normed_field.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (3) ?x_106 : integral_domain V := @normalization_domain.to_integral_domain ?x_107 ?x_108 | |
[class_instances] (4) ?x_108 : normalization_domain V := @polynomial.normalization_domain ?x_109 ?x_110 | |
failed is_def_eq | |
[class_instances] (4) ?x_108 : normalization_domain V := int.normalization_domain | |
failed is_def_eq | |
[class_instances] (4) ?x_108 : normalization_domain V := @gcd_domain.to_normalization_domain ?x_111 ?x_112 | |
[class_instances] (5) ?x_112 : gcd_domain V := int.gcd_domain | |
failed is_def_eq | |
[class_instances] (3) ?x_106 : integral_domain V := @field.to_integral_domain ?x_107 ?x_108 | |
[class_instances] (4) ?x_108 : field V := real.field | |
failed is_def_eq | |
[class_instances] (4) ?x_108 : field V := rat.field | |
failed is_def_eq | |
[class_instances] (4) ?x_108 : field V := @linear_ordered_field.to_field ?x_109 ?x_110 | |
[class_instances] (5) ?x_110 : linear_ordered_field V := real.linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_110 : linear_ordered_field V := rat.linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_110 : linear_ordered_field V := @discrete_linear_ordered_field.to_linear_ordered_field ?x_111 ?x_112 | |
[class_instances] (6) ?x_112 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_112 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (4) ?x_108 : field V := @discrete_field.to_field ?x_109 ?x_110 | |
[class_instances] (5) ?x_110 : discrete_field V := complex.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_110 : discrete_field V := @local_ring.residue_field.discrete_field ?x_111 ?x_112 | |
failed is_def_eq | |
[class_instances] (5) ?x_110 : discrete_field V := real.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_110 : discrete_field V := rat.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_110 : discrete_field V := @discrete_linear_ordered_field.to_discrete_field ?x_113 ?x_114 | |
[class_instances] (6) ?x_114 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_114 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_110 : discrete_field V := @normed_field.to_discrete_field ?x_111 ?x_112 | |
[class_instances] (6) ?x_112 : normed_field V := _inst_1 | |
failed is_def_eq | |
[class_instances] (6) ?x_112 : normed_field V := rat.normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_112 : normed_field V := normed_field.normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_112 : normed_field V := @nondiscrete_normed_field.to_normed_field ?x_113 ?x_114 | |
[class_instances] (7) ?x_114 : nondiscrete_normed_field V := rat.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (7) ?x_114 : nondiscrete_normed_field V := normed_field.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (3) ?x_106 : integral_domain V := @discrete_field.to_integral_domain ?x_107 ?x_108 ?x_109 | |
[class_instances] (4) ?x_108 : discrete_field V := complex.discrete_field | |
failed is_def_eq | |
[class_instances] (4) ?x_108 : discrete_field V := @local_ring.residue_field.discrete_field ?x_110 ?x_111 | |
failed is_def_eq | |
[class_instances] (4) ?x_108 : discrete_field V := real.discrete_field | |
failed is_def_eq | |
[class_instances] (4) ?x_108 : discrete_field V := rat.discrete_field | |
failed is_def_eq | |
[class_instances] (4) ?x_108 : discrete_field V := @discrete_linear_ordered_field.to_discrete_field ?x_112 ?x_113 | |
[class_instances] (5) ?x_113 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_113 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (4) ?x_108 : discrete_field V := @normed_field.to_discrete_field ?x_110 ?x_111 | |
[class_instances] (5) ?x_111 : normed_field V := _inst_1 | |
failed is_def_eq | |
[class_instances] (5) ?x_111 : normed_field V := rat.normed_field | |
failed is_def_eq | |
[class_instances] (5) ?x_111 : normed_field V := normed_field.normed_field | |
failed is_def_eq | |
[class_instances] (5) ?x_111 : normed_field V := @nondiscrete_normed_field.to_normed_field ?x_112 ?x_113 | |
[class_instances] (6) ?x_113 : nondiscrete_normed_field V := rat.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_113 : nondiscrete_normed_field V := normed_field.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (3) ?x_106 : integral_domain V := @linear_ordered_comm_ring.to_integral_domain ?x_107 ?x_108 | |
[class_instances] (4) ?x_108 : linear_ordered_comm_ring V := real.linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (4) ?x_108 : linear_ordered_comm_ring V := rat.linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (4) ?x_108 : linear_ordered_comm_ring V := @decidable_linear_ordered_comm_ring.to_linear_ordered_comm_ring ?x_109 ?x_110 | |
[class_instances] (5) ?x_110 : decidable_linear_ordered_comm_ring V := real.decidable_linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (5) ?x_110 : decidable_linear_ordered_comm_ring V := rat.decidable_linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (5) ?x_110 : decidable_linear_ordered_comm_ring V := int.decidable_linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (5) ?x_110 : decidable_linear_ordered_comm_ring V := @discrete_linear_ordered_field.to_decidable_linear_ordered_comm_ring ?x_111 ?x_112 | |
[class_instances] (6) ?x_112 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_112 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_110 : decidable_linear_ordered_comm_ring V := @linear_nonneg_ring.to_decidable_linear_ordered_comm_ring ?x_111 ?x_112 ?x_113 ?x_114 | |
[class_instances] (6) ?x_102 : normed_field k := rat.normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_102 : normed_field k := normed_field.normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_102 : normed_field k := @nondiscrete_normed_field.to_normed_field ?x_103 ?x_104 | |
[class_instances] (7) ?x_104 : nondiscrete_normed_field k := rat.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (7) ?x_104 : nondiscrete_normed_field k := normed_field.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (3) ?x_84 : integral_domain k := @normalization_domain.to_integral_domain ?x_85 ?x_86 | |
[class_instances] (4) ?x_86 : normalization_domain k := @polynomial.normalization_domain ?x_87 ?x_88 | |
failed is_def_eq | |
[class_instances] (4) ?x_86 : normalization_domain k := int.normalization_domain | |
failed is_def_eq | |
[class_instances] (4) ?x_86 : normalization_domain k := @gcd_domain.to_normalization_domain ?x_89 ?x_90 | |
[class_instances] (5) ?x_90 : gcd_domain k := int.gcd_domain | |
failed is_def_eq | |
[class_instances] (3) ?x_84 : integral_domain k := @field.to_integral_domain ?x_85 ?x_86 | |
[class_instances] (4) ?x_86 : field k := real.field | |
failed is_def_eq | |
[class_instances] (4) ?x_86 : field k := rat.field | |
failed is_def_eq | |
[class_instances] (4) ?x_86 : field k := @linear_ordered_field.to_field ?x_87 ?x_88 | |
[class_instances] (5) ?x_88 : linear_ordered_field k := real.linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_88 : linear_ordered_field k := rat.linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_88 : linear_ordered_field k := @discrete_linear_ordered_field.to_linear_ordered_field ?x_89 ?x_90 | |
[class_instances] (6) ?x_90 : discrete_linear_ordered_field k := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_90 : discrete_linear_ordered_field k := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (4) ?x_86 : field k := @discrete_field.to_field ?x_87 ?x_88 | |
[class_instances] (5) ?x_88 : discrete_field k := complex.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_88 : discrete_field k := @local_ring.residue_field.discrete_field ?x_89 ?x_90 | |
failed is_def_eq | |
[class_instances] (5) ?x_88 : discrete_field k := real.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_88 : discrete_field k := rat.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_88 : discrete_field k := @discrete_linear_ordered_field.to_discrete_field ?x_91 ?x_92 | |
[class_instances] (6) ?x_92 : discrete_linear_ordered_field k := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_92 : discrete_linear_ordered_field k := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_88 : discrete_field k := @normed_field.to_discrete_field ?x_89 ?x_90 | |
[class_instances] (6) ?x_90 : normed_field k := _inst_1 | |
[class_instances] (1) ?x_24 : ring V := @continuous_linear_map.ring ?x_91 ?x_92 ?x_93 ?x_94 ?x_95 ?x_96 ?x_97 | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := @subalgebra.ring ?x_98 ?x_99 ?x_100 ?x_101 ?x_102 ?x_103 | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := @algebra.comap.ring ?x_104 ?x_105 ?x_106 ?x_107 ?x_108 ?x_109 ?x_110 ?x_111 | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := @free_abelian_group.ring ?x_112 ?x_113 | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := @matrix.ring ?x_114 ?x_115 ?x_116 ?x_117 ?x_118 | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := @mv_polynomial.ring ?x_119 ?x_120 ?x_121 | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := real.ring | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := @cau_seq.ring ?x_122 ?x_123 ?x_124 ?x_125 ?x_126 ?x_127 | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := @linear_map.endomorphism_ring ?x_128 ?x_129 ?x_130 ?x_131 ?x_132 | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := @finsupp.ring ?x_133 ?x_134 ?x_135 ?x_136 | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := @prod.ring ?x_137 ?x_138 ?x_139 ?x_140 | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := @pi.ring ?x_141 ?x_142 ?x_143 | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := @subtype.ring ?x_144 ?x_145 ?x_146 ?x_147 | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := @subset.ring ?x_148 ?x_149 ?x_150 ?x_151 | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := int.ring | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := @normed_ring.to_ring ?x_152 ?x_153 | |
[class_instances] (2) ?x_153 : normed_ring V := int.normed_ring | |
failed is_def_eq | |
[class_instances] (2) ?x_153 : normed_ring V := @prod.normed_ring ?x_154 ?x_155 ?x_156 ?x_157 | |
failed is_def_eq | |
[class_instances] (2) ?x_153 : normed_ring V := @normed_field.to_normed_ring ?x_158 ?x_159 | |
[class_instances] (3) ?x_159 : normed_field V := _inst_1 | |
failed is_def_eq | |
[class_instances] (3) ?x_159 : normed_field V := rat.normed_field | |
failed is_def_eq | |
[class_instances] (3) ?x_159 : normed_field V := normed_field.normed_field | |
failed is_def_eq | |
[class_instances] (3) ?x_159 : normed_field V := @nondiscrete_normed_field.to_normed_field ?x_160 ?x_161 | |
[class_instances] (4) ?x_161 : nondiscrete_normed_field V := rat.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (4) ?x_161 : nondiscrete_normed_field V := normed_field.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := @nonneg_ring.to_ring ?x_91 ?x_92 | |
[class_instances] (2) ?x_92 : nonneg_ring V := @linear_nonneg_ring.to_nonneg_ring ?x_93 ?x_94 | |
[class_instances] (1) ?x_24 : ring V := @domain.to_ring ?x_91 ?x_92 | |
[class_instances] (2) ?x_92 : domain V := real.domain | |
failed is_def_eq | |
[class_instances] (2) ?x_92 : domain V := @division_ring.to_domain ?x_93 ?x_94 | |
[class_instances] (3) ?x_94 : division_ring V := real.division_ring | |
failed is_def_eq | |
[class_instances] (3) ?x_94 : division_ring V := rat.division_ring | |
failed is_def_eq | |
[class_instances] (3) ?x_94 : division_ring V := @field.to_division_ring ?x_95 ?x_96 | |
[class_instances] (4) ?x_96 : field V := real.field | |
failed is_def_eq | |
[class_instances] (4) ?x_96 : field V := rat.field | |
failed is_def_eq | |
[class_instances] (4) ?x_96 : field V := @linear_ordered_field.to_field ?x_97 ?x_98 | |
[class_instances] (5) ?x_98 : linear_ordered_field V := real.linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_98 : linear_ordered_field V := rat.linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_98 : linear_ordered_field V := @discrete_linear_ordered_field.to_linear_ordered_field ?x_99 ?x_100 | |
[class_instances] (6) ?x_100 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_100 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (4) ?x_96 : field V := @discrete_field.to_field ?x_97 ?x_98 | |
[class_instances] (5) ?x_98 : discrete_field V := complex.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_98 : discrete_field V := @local_ring.residue_field.discrete_field ?x_99 ?x_100 | |
failed is_def_eq | |
[class_instances] (5) ?x_98 : discrete_field V := real.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_98 : discrete_field V := rat.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_98 : discrete_field V := @discrete_linear_ordered_field.to_discrete_field ?x_101 ?x_102 | |
[class_instances] (6) ?x_102 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_102 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_98 : discrete_field V := @normed_field.to_discrete_field ?x_99 ?x_100 | |
[class_instances] (6) ?x_100 : normed_field V := _inst_1 | |
failed is_def_eq | |
[class_instances] (6) ?x_100 : normed_field V := rat.normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_100 : normed_field V := normed_field.normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_100 : normed_field V := @nondiscrete_normed_field.to_normed_field ?x_101 ?x_102 | |
[class_instances] (7) ?x_102 : nondiscrete_normed_field V := rat.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (7) ?x_102 : nondiscrete_normed_field V := normed_field.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (2) ?x_92 : domain V := @linear_nonneg_ring.to_domain ?x_93 ?x_94 | |
[class_instances] (2) ?x_92 : domain V := @linear_ordered_ring.to_domain ?x_93 ?x_94 | |
[class_instances] (3) ?x_94 : linear_ordered_ring V := real.linear_ordered_ring | |
failed is_def_eq | |
[class_instances] (3) ?x_94 : linear_ordered_ring V := rat.linear_ordered_ring | |
failed is_def_eq | |
[class_instances] (3) ?x_94 : linear_ordered_ring V := @linear_ordered_field.to_linear_ordered_ring ?x_95 ?x_96 | |
[class_instances] (4) ?x_96 : linear_ordered_field V := real.linear_ordered_field | |
failed is_def_eq | |
[class_instances] (4) ?x_96 : linear_ordered_field V := rat.linear_ordered_field | |
failed is_def_eq | |
[class_instances] (4) ?x_96 : linear_ordered_field V := @discrete_linear_ordered_field.to_linear_ordered_field ?x_97 ?x_98 | |
[class_instances] (5) ?x_98 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_98 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (3) ?x_94 : linear_ordered_ring V := @linear_nonneg_ring.to_linear_ordered_ring ?x_95 ?x_96 | |
[class_instances] (3) ?x_94 : linear_ordered_ring V := @linear_ordered_comm_ring.to_linear_ordered_ring ?x_95 ?x_96 | |
[class_instances] (4) ?x_96 : linear_ordered_comm_ring V := real.linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (4) ?x_96 : linear_ordered_comm_ring V := rat.linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (4) ?x_96 : linear_ordered_comm_ring V := @decidable_linear_ordered_comm_ring.to_linear_ordered_comm_ring ?x_97 ?x_98 | |
[class_instances] (5) ?x_98 : decidable_linear_ordered_comm_ring V := real.decidable_linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (5) ?x_98 : decidable_linear_ordered_comm_ring V := rat.decidable_linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (5) ?x_98 : decidable_linear_ordered_comm_ring V := int.decidable_linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (5) ?x_98 : decidable_linear_ordered_comm_ring V := @discrete_linear_ordered_field.to_decidable_linear_ordered_comm_ring ?x_99 ?x_100 | |
[class_instances] (6) ?x_100 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_100 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_98 : decidable_linear_ordered_comm_ring V := @linear_nonneg_ring.to_decidable_linear_ordered_comm_ring ?x_99 ?x_100 ?x_101 ?x_102 | |
[class_instances] (2) ?x_92 : domain V := @integral_domain.to_domain ?x_93 ?x_94 | |
[class_instances] (3) ?x_94 : integral_domain V := @polynomial.integral_domain ?x_95 ?x_96 | |
failed is_def_eq | |
[class_instances] (3) ?x_94 : integral_domain V := @ideal.quotient.integral_domain ?x_97 ?x_98 ?x_99 ?x_100 | |
failed is_def_eq | |
[class_instances] (3) ?x_94 : integral_domain V := real.integral_domain | |
failed is_def_eq | |
[class_instances] (3) ?x_94 : integral_domain V := @subring.domain ?x_101 ?x_102 ?x_103 ?x_104 | |
failed is_def_eq | |
[class_instances] (3) ?x_94 : integral_domain V := rat.integral_domain | |
failed is_def_eq | |
[class_instances] (3) ?x_94 : integral_domain V := @euclidean_domain.integral_domain ?x_105 ?x_106 | |
[class_instances] (4) ?x_106 : euclidean_domain V := @polynomial.euclidean_domain ?x_107 ?x_108 | |
failed is_def_eq | |
[class_instances] (4) ?x_106 : euclidean_domain V := int.euclidean_domain | |
failed is_def_eq | |
[class_instances] (4) ?x_106 : euclidean_domain V := @discrete_field.to_euclidean_domain ?x_109 ?x_110 | |
[class_instances] (5) ?x_110 : discrete_field V := complex.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_110 : discrete_field V := @local_ring.residue_field.discrete_field ?x_111 ?x_112 | |
failed is_def_eq | |
[class_instances] (5) ?x_110 : discrete_field V := real.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_110 : discrete_field V := rat.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_110 : discrete_field V := @discrete_linear_ordered_field.to_discrete_field ?x_113 ?x_114 | |
[class_instances] (6) ?x_114 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_114 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_110 : discrete_field V := @normed_field.to_discrete_field ?x_111 ?x_112 | |
[class_instances] (6) ?x_112 : normed_field V := _inst_1 | |
failed is_def_eq | |
[class_instances] (6) ?x_112 : normed_field V := rat.normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_112 : normed_field V := normed_field.normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_112 : normed_field V := @nondiscrete_normed_field.to_normed_field ?x_113 ?x_114 | |
[class_instances] (7) ?x_114 : nondiscrete_normed_field V := rat.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (7) ?x_114 : nondiscrete_normed_field V := normed_field.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (3) ?x_94 : integral_domain V := @normalization_domain.to_integral_domain ?x_95 ?x_96 | |
[class_instances] (4) ?x_96 : normalization_domain V := @polynomial.normalization_domain ?x_97 ?x_98 | |
failed is_def_eq | |
[class_instances] (4) ?x_96 : normalization_domain V := int.normalization_domain | |
failed is_def_eq | |
[class_instances] (4) ?x_96 : normalization_domain V := @gcd_domain.to_normalization_domain ?x_99 ?x_100 | |
[class_instances] (5) ?x_100 : gcd_domain V := int.gcd_domain | |
failed is_def_eq | |
[class_instances] (3) ?x_94 : integral_domain V := @field.to_integral_domain ?x_95 ?x_96 | |
[class_instances] (4) ?x_96 : field V := real.field | |
failed is_def_eq | |
[class_instances] (4) ?x_96 : field V := rat.field | |
failed is_def_eq | |
[class_instances] (4) ?x_96 : field V := @linear_ordered_field.to_field ?x_97 ?x_98 | |
[class_instances] (5) ?x_98 : linear_ordered_field V := real.linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_98 : linear_ordered_field V := rat.linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_98 : linear_ordered_field V := @discrete_linear_ordered_field.to_linear_ordered_field ?x_99 ?x_100 | |
[class_instances] (6) ?x_100 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_100 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (4) ?x_96 : field V := @discrete_field.to_field ?x_97 ?x_98 | |
[class_instances] (5) ?x_98 : discrete_field V := complex.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_98 : discrete_field V := @local_ring.residue_field.discrete_field ?x_99 ?x_100 | |
failed is_def_eq | |
[class_instances] (5) ?x_98 : discrete_field V := real.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_98 : discrete_field V := rat.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_98 : discrete_field V := @discrete_linear_ordered_field.to_discrete_field ?x_101 ?x_102 | |
[class_instances] (6) ?x_102 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_102 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_98 : discrete_field V := @normed_field.to_discrete_field ?x_99 ?x_100 | |
[class_instances] (6) ?x_100 : normed_field V := _inst_1 | |
failed is_def_eq | |
[class_instances] (6) ?x_100 : normed_field V := rat.normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_100 : normed_field V := normed_field.normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_100 : normed_field V := @nondiscrete_normed_field.to_normed_field ?x_101 ?x_102 | |
[class_instances] (7) ?x_102 : nondiscrete_normed_field V := rat.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (7) ?x_102 : nondiscrete_normed_field V := normed_field.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (3) ?x_94 : integral_domain V := @discrete_field.to_integral_domain ?x_95 ?x_96 ?x_97 | |
[class_instances] (4) ?x_96 : discrete_field V := complex.discrete_field | |
failed is_def_eq | |
[class_instances] (4) ?x_96 : discrete_field V := @local_ring.residue_field.discrete_field ?x_98 ?x_99 | |
failed is_def_eq | |
[class_instances] (4) ?x_96 : discrete_field V := real.discrete_field | |
failed is_def_eq | |
[class_instances] (4) ?x_96 : discrete_field V := rat.discrete_field | |
failed is_def_eq | |
[class_instances] (4) ?x_96 : discrete_field V := @discrete_linear_ordered_field.to_discrete_field ?x_100 ?x_101 | |
[class_instances] (5) ?x_101 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_101 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (4) ?x_96 : discrete_field V := @normed_field.to_discrete_field ?x_98 ?x_99 | |
[class_instances] (5) ?x_99 : normed_field V := _inst_1 | |
failed is_def_eq | |
[class_instances] (5) ?x_99 : normed_field V := rat.normed_field | |
failed is_def_eq | |
[class_instances] (5) ?x_99 : normed_field V := normed_field.normed_field | |
failed is_def_eq | |
[class_instances] (5) ?x_99 : normed_field V := @nondiscrete_normed_field.to_normed_field ?x_100 ?x_101 | |
[class_instances] (6) ?x_101 : nondiscrete_normed_field V := rat.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_101 : nondiscrete_normed_field V := normed_field.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (3) ?x_94 : integral_domain V := @linear_ordered_comm_ring.to_integral_domain ?x_95 ?x_96 | |
[class_instances] (4) ?x_96 : linear_ordered_comm_ring V := real.linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (4) ?x_96 : linear_ordered_comm_ring V := rat.linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (4) ?x_96 : linear_ordered_comm_ring V := @decidable_linear_ordered_comm_ring.to_linear_ordered_comm_ring ?x_97 ?x_98 | |
[class_instances] (5) ?x_98 : decidable_linear_ordered_comm_ring V := real.decidable_linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (5) ?x_98 : decidable_linear_ordered_comm_ring V := rat.decidable_linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (5) ?x_98 : decidable_linear_ordered_comm_ring V := int.decidable_linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (5) ?x_98 : decidable_linear_ordered_comm_ring V := @discrete_linear_ordered_field.to_decidable_linear_ordered_comm_ring ?x_99 ?x_100 | |
[class_instances] (6) ?x_100 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_100 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_98 : decidable_linear_ordered_comm_ring V := @linear_nonneg_ring.to_decidable_linear_ordered_comm_ring ?x_99 ?x_100 ?x_101 ?x_102 | |
[class_instances] (1) ?x_24 : ring V := @division_ring.to_ring ?x_91 ?x_92 | |
[class_instances] (2) ?x_92 : division_ring V := real.division_ring | |
failed is_def_eq | |
[class_instances] (2) ?x_92 : division_ring V := rat.division_ring | |
failed is_def_eq | |
[class_instances] (2) ?x_92 : division_ring V := @field.to_division_ring ?x_93 ?x_94 | |
[class_instances] (3) ?x_94 : field V := real.field | |
failed is_def_eq | |
[class_instances] (3) ?x_94 : field V := rat.field | |
failed is_def_eq | |
[class_instances] (3) ?x_94 : field V := @linear_ordered_field.to_field ?x_95 ?x_96 | |
[class_instances] (4) ?x_96 : linear_ordered_field V := real.linear_ordered_field | |
failed is_def_eq | |
[class_instances] (4) ?x_96 : linear_ordered_field V := rat.linear_ordered_field | |
failed is_def_eq | |
[class_instances] (4) ?x_96 : linear_ordered_field V := @discrete_linear_ordered_field.to_linear_ordered_field ?x_97 ?x_98 | |
[class_instances] (5) ?x_98 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_98 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (3) ?x_94 : field V := @discrete_field.to_field ?x_95 ?x_96 | |
[class_instances] (4) ?x_96 : discrete_field V := complex.discrete_field | |
failed is_def_eq | |
[class_instances] (4) ?x_96 : discrete_field V := @local_ring.residue_field.discrete_field ?x_97 ?x_98 | |
failed is_def_eq | |
[class_instances] (4) ?x_96 : discrete_field V := real.discrete_field | |
failed is_def_eq | |
[class_instances] (4) ?x_96 : discrete_field V := rat.discrete_field | |
failed is_def_eq | |
[class_instances] (4) ?x_96 : discrete_field V := @discrete_linear_ordered_field.to_discrete_field ?x_99 ?x_100 | |
[class_instances] (5) ?x_100 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_100 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (4) ?x_96 : discrete_field V := @normed_field.to_discrete_field ?x_97 ?x_98 | |
[class_instances] (5) ?x_98 : normed_field V := _inst_1 | |
failed is_def_eq | |
[class_instances] (5) ?x_98 : normed_field V := rat.normed_field | |
failed is_def_eq | |
[class_instances] (5) ?x_98 : normed_field V := normed_field.normed_field | |
failed is_def_eq | |
[class_instances] (5) ?x_98 : normed_field V := @nondiscrete_normed_field.to_normed_field ?x_99 ?x_100 | |
[class_instances] (6) ?x_100 : nondiscrete_normed_field V := rat.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_100 : nondiscrete_normed_field V := normed_field.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := @ordered_ring.to_ring ?x_91 ?x_92 | |
[class_instances] (2) ?x_92 : ordered_ring V := real.ordered_ring | |
failed is_def_eq | |
[class_instances] (2) ?x_92 : ordered_ring V := rat.ordered_ring | |
failed is_def_eq | |
[class_instances] (2) ?x_92 : ordered_ring V := @nonneg_ring.to_ordered_ring ?x_93 ?x_94 | |
[class_instances] (3) ?x_94 : nonneg_ring V := @linear_nonneg_ring.to_nonneg_ring ?x_95 ?x_96 | |
[class_instances] (2) ?x_92 : ordered_ring V := @linear_ordered_ring.to_ordered_ring ?x_93 ?x_94 | |
[class_instances] (3) ?x_94 : linear_ordered_ring V := real.linear_ordered_ring | |
failed is_def_eq | |
[class_instances] (3) ?x_94 : linear_ordered_ring V := rat.linear_ordered_ring | |
failed is_def_eq | |
[class_instances] (3) ?x_94 : linear_ordered_ring V := @linear_ordered_field.to_linear_ordered_ring ?x_95 ?x_96 | |
[class_instances] (4) ?x_96 : linear_ordered_field V := real.linear_ordered_field | |
failed is_def_eq | |
[class_instances] (4) ?x_96 : linear_ordered_field V := rat.linear_ordered_field | |
failed is_def_eq | |
[class_instances] (4) ?x_96 : linear_ordered_field V := @discrete_linear_ordered_field.to_linear_ordered_field ?x_97 ?x_98 | |
[class_instances] (5) ?x_98 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_98 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (3) ?x_94 : linear_ordered_ring V := @linear_nonneg_ring.to_linear_ordered_ring ?x_95 ?x_96 | |
[class_instances] (3) ?x_94 : linear_ordered_ring V := @linear_ordered_comm_ring.to_linear_ordered_ring ?x_95 ?x_96 | |
[class_instances] (4) ?x_96 : linear_ordered_comm_ring V := real.linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (4) ?x_96 : linear_ordered_comm_ring V := rat.linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (4) ?x_96 : linear_ordered_comm_ring V := @decidable_linear_ordered_comm_ring.to_linear_ordered_comm_ring ?x_97 ?x_98 | |
[class_instances] (5) ?x_98 : decidable_linear_ordered_comm_ring V := real.decidable_linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (5) ?x_98 : decidable_linear_ordered_comm_ring V := rat.decidable_linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (5) ?x_98 : decidable_linear_ordered_comm_ring V := int.decidable_linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (5) ?x_98 : decidable_linear_ordered_comm_ring V := @discrete_linear_ordered_field.to_decidable_linear_ordered_comm_ring ?x_99 ?x_100 | |
[class_instances] (6) ?x_100 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_100 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_98 : decidable_linear_ordered_comm_ring V := @linear_nonneg_ring.to_decidable_linear_ordered_comm_ring ?x_99 ?x_100 ?x_101 ?x_102 | |
[class_instances] (1) ?x_24 : ring V := @comm_ring.to_ring ?x_91 ?x_92 | |
[class_instances] (2) ?x_92 : comm_ring V := @subalgebra.comm_ring ?x_93 ?x_94 ?x_95 ?x_96 ?x_97 ?x_98 | |
failed is_def_eq | |
[class_instances] (2) ?x_92 : comm_ring V := @algebra.comap.comm_ring ?x_99 ?x_100 ?x_101 ?x_102 ?x_103 ?x_104 ?x_105 ?x_106 | |
failed is_def_eq | |
[class_instances] (2) ?x_92 : comm_ring V := @free_abelian_group.comm_ring ?x_107 ?x_108 | |
failed is_def_eq | |
[class_instances] (2) ?x_92 : comm_ring V := @mv_polynomial.comm_ring ?x_109 ?x_110 ?x_111 | |
failed is_def_eq | |
[class_instances] (2) ?x_92 : comm_ring V := @polynomial.comm_ring ?x_112 ?x_113 | |
failed is_def_eq | |
[class_instances] (2) ?x_92 : comm_ring V := complex.comm_ring | |
failed is_def_eq | |
[class_instances] (2) ?x_92 : comm_ring V := @ideal.quotient.comm_ring ?x_114 ?x_115 ?x_116 | |
failed is_def_eq | |
[class_instances] (2) ?x_92 : comm_ring V := real.comm_ring | |
failed is_def_eq | |
[class_instances] (2) ?x_92 : comm_ring V := @cau_seq.completion.comm_ring ?x_117 ?x_118 ?x_119 ?x_120 ?x_121 ?x_122 | |
failed is_def_eq | |
[class_instances] (2) ?x_92 : comm_ring V := @cau_seq.comm_ring ?x_123 ?x_124 ?x_125 ?x_126 ?x_127 ?x_128 | |
failed is_def_eq | |
[class_instances] (2) ?x_92 : comm_ring V := @finsupp.comm_ring ?x_129 ?x_130 ?x_131 ?x_132 | |
failed is_def_eq | |
[class_instances] (2) ?x_92 : comm_ring V := @prod.comm_ring ?x_133 ?x_134 ?x_135 ?x_136 | |
failed is_def_eq | |
[class_instances] (2) ?x_92 : comm_ring V := @pi.comm_ring ?x_137 ?x_138 ?x_139 | |
failed is_def_eq | |
[class_instances] (2) ?x_92 : comm_ring V := @subtype.comm_ring ?x_140 ?x_141 ?x_142 ?x_143 | |
failed is_def_eq | |
[class_instances] (2) ?x_92 : comm_ring V := @subset.comm_ring ?x_144 ?x_145 ?x_146 ?x_147 | |
failed is_def_eq | |
[class_instances] (2) ?x_92 : comm_ring V := rat.comm_ring | |
failed is_def_eq | |
[class_instances] (2) ?x_92 : comm_ring V := int.comm_ring | |
failed is_def_eq | |
[class_instances] (2) ?x_92 : comm_ring V := @nonzero_comm_ring.to_comm_ring ?x_148 ?x_149 | |
[class_instances] (3) ?x_149 : nonzero_comm_ring V := @polynomial.nonzero_comm_ring ?x_150 ?x_151 | |
failed is_def_eq | |
[class_instances] (3) ?x_149 : nonzero_comm_ring V := real.nonzero_comm_ring | |
failed is_def_eq | |
[class_instances] (3) ?x_149 : nonzero_comm_ring V := @prod.nonzero_comm_ring ?x_152 ?x_153 ?x_154 ?x_155 | |
failed is_def_eq | |
[class_instances] (3) ?x_149 : nonzero_comm_ring V := rat.nonzero_comm_ring | |
failed is_def_eq | |
[class_instances] (3) ?x_149 : nonzero_comm_ring V := @euclidean_domain.to_nonzero_comm_ring ?x_156 ?x_157 | |
[class_instances] (4) ?x_157 : euclidean_domain V := @polynomial.euclidean_domain ?x_158 ?x_159 | |
failed is_def_eq | |
[class_instances] (4) ?x_157 : euclidean_domain V := int.euclidean_domain | |
failed is_def_eq | |
[class_instances] (4) ?x_157 : euclidean_domain V := @discrete_field.to_euclidean_domain ?x_160 ?x_161 | |
[class_instances] (5) ?x_161 : discrete_field V := complex.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_161 : discrete_field V := @local_ring.residue_field.discrete_field ?x_162 ?x_163 | |
failed is_def_eq | |
[class_instances] (5) ?x_161 : discrete_field V := real.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_161 : discrete_field V := rat.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_161 : discrete_field V := @discrete_linear_ordered_field.to_discrete_field ?x_164 ?x_165 | |
[class_instances] (6) ?x_165 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_165 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_161 : discrete_field V := @normed_field.to_discrete_field ?x_162 ?x_163 | |
[class_instances] (6) ?x_163 : normed_field V := _inst_1 | |
failed is_def_eq | |
[class_instances] (6) ?x_163 : normed_field V := rat.normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_163 : normed_field V := normed_field.normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_163 : normed_field V := @nondiscrete_normed_field.to_normed_field ?x_164 ?x_165 | |
[class_instances] (7) ?x_165 : nondiscrete_normed_field V := rat.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (7) ?x_165 : nondiscrete_normed_field V := normed_field.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (3) ?x_149 : nonzero_comm_ring V := @local_ring.to_nonzero_comm_ring ?x_150 ?x_151 | |
[class_instances] (4) ?x_151 : local_ring V := @discrete_field.local_ring ?x_152 ?x_153 | |
[class_instances] (5) ?x_153 : discrete_field V := complex.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_153 : discrete_field V := @local_ring.residue_field.discrete_field ?x_154 ?x_155 | |
failed is_def_eq | |
[class_instances] (5) ?x_153 : discrete_field V := real.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_153 : discrete_field V := rat.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_153 : discrete_field V := @discrete_linear_ordered_field.to_discrete_field ?x_156 ?x_157 | |
[class_instances] (6) ?x_157 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_157 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_153 : discrete_field V := @normed_field.to_discrete_field ?x_154 ?x_155 | |
[class_instances] (6) ?x_155 : normed_field V := _inst_1 | |
failed is_def_eq | |
[class_instances] (6) ?x_155 : normed_field V := rat.normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_155 : normed_field V := normed_field.normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_155 : normed_field V := @nondiscrete_normed_field.to_normed_field ?x_156 ?x_157 | |
[class_instances] (7) ?x_157 : nondiscrete_normed_field V := rat.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (7) ?x_157 : nondiscrete_normed_field V := normed_field.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (3) ?x_149 : nonzero_comm_ring V := @integral_domain.to_nonzero_comm_ring ?x_150 ?x_151 | |
[class_instances] (4) ?x_151 : integral_domain V := @polynomial.integral_domain ?x_152 ?x_153 | |
failed is_def_eq | |
[class_instances] (4) ?x_151 : integral_domain V := @ideal.quotient.integral_domain ?x_154 ?x_155 ?x_156 ?x_157 | |
failed is_def_eq | |
[class_instances] (4) ?x_151 : integral_domain V := real.integral_domain | |
failed is_def_eq | |
[class_instances] (4) ?x_151 : integral_domain V := @subring.domain ?x_158 ?x_159 ?x_160 ?x_161 | |
failed is_def_eq | |
[class_instances] (4) ?x_151 : integral_domain V := rat.integral_domain | |
failed is_def_eq | |
[class_instances] (4) ?x_151 : integral_domain V := @euclidean_domain.integral_domain ?x_162 ?x_163 | |
[class_instances] (5) ?x_163 : euclidean_domain V := @polynomial.euclidean_domain ?x_164 ?x_165 | |
failed is_def_eq | |
[class_instances] (5) ?x_163 : euclidean_domain V := int.euclidean_domain | |
failed is_def_eq | |
[class_instances] (5) ?x_163 : euclidean_domain V := @discrete_field.to_euclidean_domain ?x_166 ?x_167 | |
[class_instances] (6) ?x_167 : discrete_field V := complex.discrete_field | |
failed is_def_eq | |
[class_instances] (6) ?x_167 : discrete_field V := @local_ring.residue_field.discrete_field ?x_168 ?x_169 | |
failed is_def_eq | |
[class_instances] (6) ?x_167 : discrete_field V := real.discrete_field | |
failed is_def_eq | |
[class_instances] (6) ?x_167 : discrete_field V := rat.discrete_field | |
failed is_def_eq | |
[class_instances] (6) ?x_167 : discrete_field V := @discrete_linear_ordered_field.to_discrete_field ?x_170 ?x_171 | |
[class_instances] (7) ?x_171 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (7) ?x_171 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_167 : discrete_field V := @normed_field.to_discrete_field ?x_168 ?x_169 | |
[class_instances] (7) ?x_169 : normed_field V := _inst_1 | |
failed is_def_eq | |
[class_instances] (7) ?x_169 : normed_field V := rat.normed_field | |
failed is_def_eq | |
[class_instances] (7) ?x_169 : normed_field V := normed_field.normed_field | |
failed is_def_eq | |
[class_instances] (7) ?x_169 : normed_field V := @nondiscrete_normed_field.to_normed_field ?x_170 ?x_171 | |
[class_instances] (8) ?x_171 : nondiscrete_normed_field V := rat.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (8) ?x_171 : nondiscrete_normed_field V := normed_field.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (4) ?x_151 : integral_domain V := @normalization_domain.to_integral_domain ?x_152 ?x_153 | |
[class_instances] (5) ?x_153 : normalization_domain V := @polynomial.normalization_domain ?x_154 ?x_155 | |
failed is_def_eq | |
[class_instances] (5) ?x_153 : normalization_domain V := int.normalization_domain | |
failed is_def_eq | |
[class_instances] (5) ?x_153 : normalization_domain V := @gcd_domain.to_normalization_domain ?x_156 ?x_157 | |
[class_instances] (6) ?x_157 : gcd_domain V := int.gcd_domain | |
failed is_def_eq | |
[class_instances] (4) ?x_151 : integral_domain V := @field.to_integral_domain ?x_152 ?x_153 | |
[class_instances] (5) ?x_153 : field V := real.field | |
failed is_def_eq | |
[class_instances] (5) ?x_153 : field V := rat.field | |
failed is_def_eq | |
[class_instances] (5) ?x_153 : field V := @linear_ordered_field.to_field ?x_154 ?x_155 | |
[class_instances] (6) ?x_155 : linear_ordered_field V := real.linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_155 : linear_ordered_field V := rat.linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_155 : linear_ordered_field V := @discrete_linear_ordered_field.to_linear_ordered_field ?x_156 ?x_157 | |
[class_instances] (7) ?x_157 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (7) ?x_157 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_153 : field V := @discrete_field.to_field ?x_154 ?x_155 | |
[class_instances] (6) ?x_155 : discrete_field V := complex.discrete_field | |
failed is_def_eq | |
[class_instances] (6) ?x_155 : discrete_field V := @local_ring.residue_field.discrete_field ?x_156 ?x_157 | |
failed is_def_eq | |
[class_instances] (6) ?x_155 : discrete_field V := real.discrete_field | |
failed is_def_eq | |
[class_instances] (6) ?x_155 : discrete_field V := rat.discrete_field | |
failed is_def_eq | |
[class_instances] (6) ?x_155 : discrete_field V := @discrete_linear_ordered_field.to_discrete_field ?x_158 ?x_159 | |
[class_instances] (7) ?x_159 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (7) ?x_159 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_155 : discrete_field V := @normed_field.to_discrete_field ?x_156 ?x_157 | |
[class_instances] (7) ?x_157 : normed_field V := _inst_1 | |
failed is_def_eq | |
[class_instances] (7) ?x_157 : normed_field V := rat.normed_field | |
failed is_def_eq | |
[class_instances] (7) ?x_157 : normed_field V := normed_field.normed_field | |
failed is_def_eq | |
[class_instances] (7) ?x_157 : normed_field V := @nondiscrete_normed_field.to_normed_field ?x_158 ?x_159 | |
[class_instances] (8) ?x_159 : nondiscrete_normed_field V := rat.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (8) ?x_159 : nondiscrete_normed_field V := normed_field.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (4) ?x_151 : integral_domain V := @discrete_field.to_integral_domain ?x_152 ?x_153 ?x_154 | |
[class_instances] (5) ?x_153 : discrete_field V := complex.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_153 : discrete_field V := @local_ring.residue_field.discrete_field ?x_155 ?x_156 | |
failed is_def_eq | |
[class_instances] (5) ?x_153 : discrete_field V := real.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_153 : discrete_field V := rat.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_153 : discrete_field V := @discrete_linear_ordered_field.to_discrete_field ?x_157 ?x_158 | |
[class_instances] (6) ?x_158 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_158 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_153 : discrete_field V := @normed_field.to_discrete_field ?x_155 ?x_156 | |
[class_instances] (6) ?x_156 : normed_field V := _inst_1 | |
failed is_def_eq | |
[class_instances] (6) ?x_156 : normed_field V := rat.normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_156 : normed_field V := normed_field.normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_156 : normed_field V := @nondiscrete_normed_field.to_normed_field ?x_157 ?x_158 | |
[class_instances] (7) ?x_158 : nondiscrete_normed_field V := rat.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (7) ?x_158 : nondiscrete_normed_field V := normed_field.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (4) ?x_151 : integral_domain V := @linear_ordered_comm_ring.to_integral_domain ?x_152 ?x_153 | |
[class_instances] (5) ?x_153 : linear_ordered_comm_ring V := real.linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (5) ?x_153 : linear_ordered_comm_ring V := rat.linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (5) ?x_153 : linear_ordered_comm_ring V := @decidable_linear_ordered_comm_ring.to_linear_ordered_comm_ring ?x_154 ?x_155 | |
[class_instances] (6) ?x_155 : decidable_linear_ordered_comm_ring V := real.decidable_linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (6) ?x_155 : decidable_linear_ordered_comm_ring V := rat.decidable_linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (6) ?x_155 : decidable_linear_ordered_comm_ring V := int.decidable_linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (6) ?x_155 : decidable_linear_ordered_comm_ring V := @discrete_linear_ordered_field.to_decidable_linear_ordered_comm_ring ?x_156 ?x_157 | |
[class_instances] (7) ?x_157 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (7) ?x_157 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_155 : decidable_linear_ordered_comm_ring V := @linear_nonneg_ring.to_decidable_linear_ordered_comm_ring ?x_156 ?x_157 ?x_158 ?x_159 | |
[class_instances] (2) ?x_92 : comm_ring V := @field.to_comm_ring ?x_93 ?x_94 | |
[class_instances] (3) ?x_94 : field V := real.field | |
failed is_def_eq | |
[class_instances] (3) ?x_94 : field V := rat.field | |
failed is_def_eq | |
[class_instances] (3) ?x_94 : field V := @linear_ordered_field.to_field ?x_95 ?x_96 | |
[class_instances] (4) ?x_96 : linear_ordered_field V := real.linear_ordered_field | |
failed is_def_eq | |
[class_instances] (4) ?x_96 : linear_ordered_field V := rat.linear_ordered_field | |
failed is_def_eq | |
[class_instances] (4) ?x_96 : linear_ordered_field V := @discrete_linear_ordered_field.to_linear_ordered_field ?x_97 ?x_98 | |
[class_instances] (5) ?x_98 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_98 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (3) ?x_94 : field V := @discrete_field.to_field ?x_95 ?x_96 | |
[class_instances] (4) ?x_96 : discrete_field V := complex.discrete_field | |
failed is_def_eq | |
[class_instances] (4) ?x_96 : discrete_field V := @local_ring.residue_field.discrete_field ?x_97 ?x_98 | |
failed is_def_eq | |
[class_instances] (4) ?x_96 : discrete_field V := real.discrete_field | |
failed is_def_eq | |
[class_instances] (4) ?x_96 : discrete_field V := rat.discrete_field | |
failed is_def_eq | |
[class_instances] (4) ?x_96 : discrete_field V := @discrete_linear_ordered_field.to_discrete_field ?x_99 ?x_100 | |
[class_instances] (5) ?x_100 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_100 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (4) ?x_96 : discrete_field V := @normed_field.to_discrete_field ?x_97 ?x_98 | |
[class_instances] (5) ?x_98 : normed_field V := _inst_1 | |
failed is_def_eq | |
[class_instances] (5) ?x_98 : normed_field V := rat.normed_field | |
failed is_def_eq | |
[class_instances] (5) ?x_98 : normed_field V := normed_field.normed_field | |
failed is_def_eq | |
[class_instances] (5) ?x_98 : normed_field V := @nondiscrete_normed_field.to_normed_field ?x_99 ?x_100 | |
[class_instances] (6) ?x_100 : nondiscrete_normed_field V := rat.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_100 : nondiscrete_normed_field V := normed_field.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (2) ?x_92 : comm_ring V := @integral_domain.to_comm_ring ?x_93 ?x_94 | |
[class_instances] (3) ?x_94 : integral_domain V := @polynomial.integral_domain ?x_95 ?x_96 | |
failed is_def_eq | |
[class_instances] (3) ?x_94 : integral_domain V := @ideal.quotient.integral_domain ?x_97 ?x_98 ?x_99 ?x_100 | |
failed is_def_eq | |
[class_instances] (3) ?x_94 : integral_domain V := real.integral_domain | |
failed is_def_eq | |
[class_instances] (3) ?x_94 : integral_domain V := @subring.domain ?x_101 ?x_102 ?x_103 ?x_104 | |
failed is_def_eq | |
[class_instances] (3) ?x_94 : integral_domain V := rat.integral_domain | |
failed is_def_eq | |
[class_instances] (3) ?x_94 : integral_domain V := @euclidean_domain.integral_domain ?x_105 ?x_106 | |
[class_instances] (4) ?x_106 : euclidean_domain V := @polynomial.euclidean_domain ?x_107 ?x_108 | |
failed is_def_eq | |
[class_instances] (4) ?x_106 : euclidean_domain V := int.euclidean_domain | |
failed is_def_eq | |
[class_instances] (4) ?x_106 : euclidean_domain V := @discrete_field.to_euclidean_domain ?x_109 ?x_110 | |
[class_instances] (5) ?x_110 : discrete_field V := complex.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_110 : discrete_field V := @local_ring.residue_field.discrete_field ?x_111 ?x_112 | |
failed is_def_eq | |
[class_instances] (5) ?x_110 : discrete_field V := real.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_110 : discrete_field V := rat.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_110 : discrete_field V := @discrete_linear_ordered_field.to_discrete_field ?x_113 ?x_114 | |
[class_instances] (6) ?x_114 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_114 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_110 : discrete_field V := @normed_field.to_discrete_field ?x_111 ?x_112 | |
[class_instances] (6) ?x_112 : normed_field V := _inst_1 | |
failed is_def_eq | |
[class_instances] (6) ?x_112 : normed_field V := rat.normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_112 : normed_field V := normed_field.normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_112 : normed_field V := @nondiscrete_normed_field.to_normed_field ?x_113 ?x_114 | |
[class_instances] (7) ?x_114 : nondiscrete_normed_field V := rat.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (7) ?x_114 : nondiscrete_normed_field V := normed_field.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (3) ?x_94 : integral_domain V := @normalization_domain.to_integral_domain ?x_95 ?x_96 | |
[class_instances] (4) ?x_96 : normalization_domain V := @polynomial.normalization_domain ?x_97 ?x_98 | |
failed is_def_eq | |
[class_instances] (4) ?x_96 : normalization_domain V := int.normalization_domain | |
failed is_def_eq | |
[class_instances] (4) ?x_96 : normalization_domain V := @gcd_domain.to_normalization_domain ?x_99 ?x_100 | |
[class_instances] (5) ?x_100 : gcd_domain V := int.gcd_domain | |
failed is_def_eq | |
[class_instances] (3) ?x_94 : integral_domain V := @field.to_integral_domain ?x_95 ?x_96 | |
[class_instances] (4) ?x_96 : field V := real.field | |
failed is_def_eq | |
[class_instances] (4) ?x_96 : field V := rat.field | |
failed is_def_eq | |
[class_instances] (4) ?x_96 : field V := @linear_ordered_field.to_field ?x_97 ?x_98 | |
[class_instances] (5) ?x_98 : linear_ordered_field V := real.linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_98 : linear_ordered_field V := rat.linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_98 : linear_ordered_field V := @discrete_linear_ordered_field.to_linear_ordered_field ?x_99 ?x_100 | |
[class_instances] (6) ?x_100 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_100 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (4) ?x_96 : field V := @discrete_field.to_field ?x_97 ?x_98 | |
[class_instances] (5) ?x_98 : discrete_field V := complex.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_98 : discrete_field V := @local_ring.residue_field.discrete_field ?x_99 ?x_100 | |
failed is_def_eq | |
[class_instances] (5) ?x_98 : discrete_field V := real.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_98 : discrete_field V := rat.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_98 : discrete_field V := @discrete_linear_ordered_field.to_discrete_field ?x_101 ?x_102 | |
[class_instances] (6) ?x_102 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_102 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_98 : discrete_field V := @normed_field.to_discrete_field ?x_99 ?x_100 | |
[class_instances] (6) ?x_100 : normed_field V := _inst_1 | |
failed is_def_eq | |
[class_instances] (6) ?x_100 : normed_field V := rat.normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_100 : normed_field V := normed_field.normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_100 : normed_field V := @nondiscrete_normed_field.to_normed_field ?x_101 ?x_102 | |
[class_instances] (7) ?x_102 : nondiscrete_normed_field V := rat.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (7) ?x_102 : nondiscrete_normed_field V := normed_field.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (3) ?x_94 : integral_domain V := @discrete_field.to_integral_domain ?x_95 ?x_96 ?x_97 | |
[class_instances] (4) ?x_96 : discrete_field V := complex.discrete_field | |
failed is_def_eq | |
[class_instances] (4) ?x_96 : discrete_field V := @local_ring.residue_field.discrete_field ?x_98 ?x_99 | |
failed is_def_eq | |
[class_instances] (4) ?x_96 : discrete_field V := real.discrete_field | |
failed is_def_eq | |
[class_instances] (4) ?x_96 : discrete_field V := rat.discrete_field | |
failed is_def_eq | |
[class_instances] (4) ?x_96 : discrete_field V := @discrete_linear_ordered_field.to_discrete_field ?x_100 ?x_101 | |
[class_instances] (5) ?x_101 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_101 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (4) ?x_96 : discrete_field V := @normed_field.to_discrete_field ?x_98 ?x_99 | |
[class_instances] (5) ?x_99 : normed_field V := _inst_1 | |
failed is_def_eq | |
[class_instances] (5) ?x_99 : normed_field V := rat.normed_field | |
failed is_def_eq | |
[class_instances] (5) ?x_99 : normed_field V := normed_field.normed_field | |
failed is_def_eq | |
[class_instances] (5) ?x_99 : normed_field V := @nondiscrete_normed_field.to_normed_field ?x_100 ?x_101 | |
[class_instances] (6) ?x_101 : nondiscrete_normed_field V := rat.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_101 : nondiscrete_normed_field V := normed_field.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (3) ?x_94 : integral_domain V := @linear_ordered_comm_ring.to_integral_domain ?x_95 ?x_96 | |
[class_instances] (4) ?x_96 : linear_ordered_comm_ring V := real.linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (4) ?x_96 : linear_ordered_comm_ring V := rat.linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (4) ?x_96 : linear_ordered_comm_ring V := @decidable_linear_ordered_comm_ring.to_linear_ordered_comm_ring ?x_97 ?x_98 | |
[class_instances] (5) ?x_98 : decidable_linear_ordered_comm_ring V := real.decidable_linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (5) ?x_98 : decidable_linear_ordered_comm_ring V := rat.decidable_linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (5) ?x_98 : decidable_linear_ordered_comm_ring V := int.decidable_linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (5) ?x_98 : decidable_linear_ordered_comm_ring V := @discrete_linear_ordered_field.to_decidable_linear_ordered_comm_ring ?x_99 ?x_100 | |
[class_instances] (6) ?x_100 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_100 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_98 : decidable_linear_ordered_comm_ring V := @linear_nonneg_ring.to_decidable_linear_ordered_comm_ring ?x_99 ?x_100 ?x_101 ?x_102 | |
[class_instances] (6) ?x_90 : normed_field k := rat.normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_90 : normed_field k := normed_field.normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_90 : normed_field k := @nondiscrete_normed_field.to_normed_field ?x_91 ?x_92 | |
[class_instances] (7) ?x_92 : nondiscrete_normed_field k := rat.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (7) ?x_92 : nondiscrete_normed_field k := normed_field.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (3) ?x_84 : integral_domain k := @discrete_field.to_integral_domain ?x_85 ?x_86 ?x_87 | |
[class_instances] (4) ?x_86 : discrete_field k := complex.discrete_field | |
failed is_def_eq | |
[class_instances] (4) ?x_86 : discrete_field k := @local_ring.residue_field.discrete_field ?x_88 ?x_89 | |
failed is_def_eq | |
[class_instances] (4) ?x_86 : discrete_field k := real.discrete_field | |
failed is_def_eq | |
[class_instances] (4) ?x_86 : discrete_field k := rat.discrete_field | |
failed is_def_eq | |
[class_instances] (4) ?x_86 : discrete_field k := @discrete_linear_ordered_field.to_discrete_field ?x_90 ?x_91 | |
[class_instances] (5) ?x_91 : discrete_linear_ordered_field k := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_91 : discrete_linear_ordered_field k := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (4) ?x_86 : discrete_field k := @normed_field.to_discrete_field ?x_88 ?x_89 | |
[class_instances] (5) ?x_89 : normed_field k := _inst_1 | |
[class_instances] (4) ?x_87 : discrete_field k := complex.discrete_field | |
failed is_def_eq | |
[class_instances] (4) ?x_87 : discrete_field k := @local_ring.residue_field.discrete_field ?x_90 ?x_91 | |
failed is_def_eq | |
[class_instances] (4) ?x_87 : discrete_field k := real.discrete_field | |
failed is_def_eq | |
[class_instances] (4) ?x_87 : discrete_field k := rat.discrete_field | |
failed is_def_eq | |
[class_instances] (4) ?x_87 : discrete_field k := @discrete_linear_ordered_field.to_discrete_field ?x_92 ?x_93 | |
[class_instances] (5) ?x_93 : discrete_linear_ordered_field k := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_93 : discrete_linear_ordered_field k := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (4) ?x_87 : discrete_field k := @normed_field.to_discrete_field ?x_90 ?x_91 | |
[class_instances] (5) ?x_91 : normed_field k := _inst_1 | |
[class_instances] (1) ?x_24 : ring V := @continuous_linear_map.ring ?x_92 ?x_93 ?x_94 ?x_95 ?x_96 ?x_97 ?x_98 | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := @subalgebra.ring ?x_99 ?x_100 ?x_101 ?x_102 ?x_103 ?x_104 | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := @algebra.comap.ring ?x_105 ?x_106 ?x_107 ?x_108 ?x_109 ?x_110 ?x_111 ?x_112 | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := @free_abelian_group.ring ?x_113 ?x_114 | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := @matrix.ring ?x_115 ?x_116 ?x_117 ?x_118 ?x_119 | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := @mv_polynomial.ring ?x_120 ?x_121 ?x_122 | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := real.ring | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := @cau_seq.ring ?x_123 ?x_124 ?x_125 ?x_126 ?x_127 ?x_128 | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := @linear_map.endomorphism_ring ?x_129 ?x_130 ?x_131 ?x_132 ?x_133 | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := @finsupp.ring ?x_134 ?x_135 ?x_136 ?x_137 | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := @prod.ring ?x_138 ?x_139 ?x_140 ?x_141 | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := @pi.ring ?x_142 ?x_143 ?x_144 | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := @subtype.ring ?x_145 ?x_146 ?x_147 ?x_148 | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := @subset.ring ?x_149 ?x_150 ?x_151 ?x_152 | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := int.ring | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := @normed_ring.to_ring ?x_153 ?x_154 | |
[class_instances] (2) ?x_154 : normed_ring V := int.normed_ring | |
failed is_def_eq | |
[class_instances] (2) ?x_154 : normed_ring V := @prod.normed_ring ?x_155 ?x_156 ?x_157 ?x_158 | |
failed is_def_eq | |
[class_instances] (2) ?x_154 : normed_ring V := @normed_field.to_normed_ring ?x_159 ?x_160 | |
[class_instances] (3) ?x_160 : normed_field V := _inst_1 | |
failed is_def_eq | |
[class_instances] (3) ?x_160 : normed_field V := rat.normed_field | |
failed is_def_eq | |
[class_instances] (3) ?x_160 : normed_field V := normed_field.normed_field | |
failed is_def_eq | |
[class_instances] (3) ?x_160 : normed_field V := @nondiscrete_normed_field.to_normed_field ?x_161 ?x_162 | |
[class_instances] (4) ?x_162 : nondiscrete_normed_field V := rat.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (4) ?x_162 : nondiscrete_normed_field V := normed_field.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := @nonneg_ring.to_ring ?x_92 ?x_93 | |
[class_instances] (2) ?x_93 : nonneg_ring V := @linear_nonneg_ring.to_nonneg_ring ?x_94 ?x_95 | |
[class_instances] (1) ?x_24 : ring V := @domain.to_ring ?x_92 ?x_93 | |
[class_instances] (2) ?x_93 : domain V := real.domain | |
failed is_def_eq | |
[class_instances] (2) ?x_93 : domain V := @division_ring.to_domain ?x_94 ?x_95 | |
[class_instances] (3) ?x_95 : division_ring V := real.division_ring | |
failed is_def_eq | |
[class_instances] (3) ?x_95 : division_ring V := rat.division_ring | |
failed is_def_eq | |
[class_instances] (3) ?x_95 : division_ring V := @field.to_division_ring ?x_96 ?x_97 | |
[class_instances] (4) ?x_97 : field V := real.field | |
failed is_def_eq | |
[class_instances] (4) ?x_97 : field V := rat.field | |
failed is_def_eq | |
[class_instances] (4) ?x_97 : field V := @linear_ordered_field.to_field ?x_98 ?x_99 | |
[class_instances] (5) ?x_99 : linear_ordered_field V := real.linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_99 : linear_ordered_field V := rat.linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_99 : linear_ordered_field V := @discrete_linear_ordered_field.to_linear_ordered_field ?x_100 ?x_101 | |
[class_instances] (6) ?x_101 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_101 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (4) ?x_97 : field V := @discrete_field.to_field ?x_98 ?x_99 | |
[class_instances] (5) ?x_99 : discrete_field V := complex.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_99 : discrete_field V := @local_ring.residue_field.discrete_field ?x_100 ?x_101 | |
failed is_def_eq | |
[class_instances] (5) ?x_99 : discrete_field V := real.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_99 : discrete_field V := rat.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_99 : discrete_field V := @discrete_linear_ordered_field.to_discrete_field ?x_102 ?x_103 | |
[class_instances] (6) ?x_103 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_103 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_99 : discrete_field V := @normed_field.to_discrete_field ?x_100 ?x_101 | |
[class_instances] (6) ?x_101 : normed_field V := _inst_1 | |
failed is_def_eq | |
[class_instances] (6) ?x_101 : normed_field V := rat.normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_101 : normed_field V := normed_field.normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_101 : normed_field V := @nondiscrete_normed_field.to_normed_field ?x_102 ?x_103 | |
[class_instances] (7) ?x_103 : nondiscrete_normed_field V := rat.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (7) ?x_103 : nondiscrete_normed_field V := normed_field.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (2) ?x_93 : domain V := @linear_nonneg_ring.to_domain ?x_94 ?x_95 | |
[class_instances] (2) ?x_93 : domain V := @linear_ordered_ring.to_domain ?x_94 ?x_95 | |
[class_instances] (3) ?x_95 : linear_ordered_ring V := real.linear_ordered_ring | |
failed is_def_eq | |
[class_instances] (3) ?x_95 : linear_ordered_ring V := rat.linear_ordered_ring | |
failed is_def_eq | |
[class_instances] (3) ?x_95 : linear_ordered_ring V := @linear_ordered_field.to_linear_ordered_ring ?x_96 ?x_97 | |
[class_instances] (4) ?x_97 : linear_ordered_field V := real.linear_ordered_field | |
failed is_def_eq | |
[class_instances] (4) ?x_97 : linear_ordered_field V := rat.linear_ordered_field | |
failed is_def_eq | |
[class_instances] (4) ?x_97 : linear_ordered_field V := @discrete_linear_ordered_field.to_linear_ordered_field ?x_98 ?x_99 | |
[class_instances] (5) ?x_99 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_99 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (3) ?x_95 : linear_ordered_ring V := @linear_nonneg_ring.to_linear_ordered_ring ?x_96 ?x_97 | |
[class_instances] (3) ?x_95 : linear_ordered_ring V := @linear_ordered_comm_ring.to_linear_ordered_ring ?x_96 ?x_97 | |
[class_instances] (4) ?x_97 : linear_ordered_comm_ring V := real.linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (4) ?x_97 : linear_ordered_comm_ring V := rat.linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (4) ?x_97 : linear_ordered_comm_ring V := @decidable_linear_ordered_comm_ring.to_linear_ordered_comm_ring ?x_98 ?x_99 | |
[class_instances] (5) ?x_99 : decidable_linear_ordered_comm_ring V := real.decidable_linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (5) ?x_99 : decidable_linear_ordered_comm_ring V := rat.decidable_linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (5) ?x_99 : decidable_linear_ordered_comm_ring V := int.decidable_linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (5) ?x_99 : decidable_linear_ordered_comm_ring V := @discrete_linear_ordered_field.to_decidable_linear_ordered_comm_ring ?x_100 ?x_101 | |
[class_instances] (6) ?x_101 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_101 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_99 : decidable_linear_ordered_comm_ring V := @linear_nonneg_ring.to_decidable_linear_ordered_comm_ring ?x_100 ?x_101 ?x_102 ?x_103 | |
[class_instances] (2) ?x_93 : domain V := @integral_domain.to_domain ?x_94 ?x_95 | |
[class_instances] (3) ?x_95 : integral_domain V := @polynomial.integral_domain ?x_96 ?x_97 | |
failed is_def_eq | |
[class_instances] (3) ?x_95 : integral_domain V := @ideal.quotient.integral_domain ?x_98 ?x_99 ?x_100 ?x_101 | |
failed is_def_eq | |
[class_instances] (3) ?x_95 : integral_domain V := real.integral_domain | |
failed is_def_eq | |
[class_instances] (3) ?x_95 : integral_domain V := @subring.domain ?x_102 ?x_103 ?x_104 ?x_105 | |
failed is_def_eq | |
[class_instances] (3) ?x_95 : integral_domain V := rat.integral_domain | |
failed is_def_eq | |
[class_instances] (3) ?x_95 : integral_domain V := @euclidean_domain.integral_domain ?x_106 ?x_107 | |
[class_instances] (4) ?x_107 : euclidean_domain V := @polynomial.euclidean_domain ?x_108 ?x_109 | |
failed is_def_eq | |
[class_instances] (4) ?x_107 : euclidean_domain V := int.euclidean_domain | |
failed is_def_eq | |
[class_instances] (4) ?x_107 : euclidean_domain V := @discrete_field.to_euclidean_domain ?x_110 ?x_111 | |
[class_instances] (5) ?x_111 : discrete_field V := complex.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_111 : discrete_field V := @local_ring.residue_field.discrete_field ?x_112 ?x_113 | |
failed is_def_eq | |
[class_instances] (5) ?x_111 : discrete_field V := real.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_111 : discrete_field V := rat.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_111 : discrete_field V := @discrete_linear_ordered_field.to_discrete_field ?x_114 ?x_115 | |
[class_instances] (6) ?x_115 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_115 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_111 : discrete_field V := @normed_field.to_discrete_field ?x_112 ?x_113 | |
[class_instances] (6) ?x_113 : normed_field V := _inst_1 | |
failed is_def_eq | |
[class_instances] (6) ?x_113 : normed_field V := rat.normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_113 : normed_field V := normed_field.normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_113 : normed_field V := @nondiscrete_normed_field.to_normed_field ?x_114 ?x_115 | |
[class_instances] (7) ?x_115 : nondiscrete_normed_field V := rat.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (7) ?x_115 : nondiscrete_normed_field V := normed_field.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (3) ?x_95 : integral_domain V := @normalization_domain.to_integral_domain ?x_96 ?x_97 | |
[class_instances] (4) ?x_97 : normalization_domain V := @polynomial.normalization_domain ?x_98 ?x_99 | |
failed is_def_eq | |
[class_instances] (4) ?x_97 : normalization_domain V := int.normalization_domain | |
failed is_def_eq | |
[class_instances] (4) ?x_97 : normalization_domain V := @gcd_domain.to_normalization_domain ?x_100 ?x_101 | |
[class_instances] (5) ?x_101 : gcd_domain V := int.gcd_domain | |
failed is_def_eq | |
[class_instances] (3) ?x_95 : integral_domain V := @field.to_integral_domain ?x_96 ?x_97 | |
[class_instances] (4) ?x_97 : field V := real.field | |
failed is_def_eq | |
[class_instances] (4) ?x_97 : field V := rat.field | |
failed is_def_eq | |
[class_instances] (4) ?x_97 : field V := @linear_ordered_field.to_field ?x_98 ?x_99 | |
[class_instances] (5) ?x_99 : linear_ordered_field V := real.linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_99 : linear_ordered_field V := rat.linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_99 : linear_ordered_field V := @discrete_linear_ordered_field.to_linear_ordered_field ?x_100 ?x_101 | |
[class_instances] (6) ?x_101 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_101 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (4) ?x_97 : field V := @discrete_field.to_field ?x_98 ?x_99 | |
[class_instances] (5) ?x_99 : discrete_field V := complex.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_99 : discrete_field V := @local_ring.residue_field.discrete_field ?x_100 ?x_101 | |
failed is_def_eq | |
[class_instances] (5) ?x_99 : discrete_field V := real.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_99 : discrete_field V := rat.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_99 : discrete_field V := @discrete_linear_ordered_field.to_discrete_field ?x_102 ?x_103 | |
[class_instances] (6) ?x_103 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_103 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_99 : discrete_field V := @normed_field.to_discrete_field ?x_100 ?x_101 | |
[class_instances] (6) ?x_101 : normed_field V := _inst_1 | |
failed is_def_eq | |
[class_instances] (6) ?x_101 : normed_field V := rat.normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_101 : normed_field V := normed_field.normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_101 : normed_field V := @nondiscrete_normed_field.to_normed_field ?x_102 ?x_103 | |
[class_instances] (7) ?x_103 : nondiscrete_normed_field V := rat.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (7) ?x_103 : nondiscrete_normed_field V := normed_field.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (3) ?x_95 : integral_domain V := @discrete_field.to_integral_domain ?x_96 ?x_97 ?x_98 | |
[class_instances] (4) ?x_97 : discrete_field V := complex.discrete_field | |
failed is_def_eq | |
[class_instances] (4) ?x_97 : discrete_field V := @local_ring.residue_field.discrete_field ?x_99 ?x_100 | |
failed is_def_eq | |
[class_instances] (4) ?x_97 : discrete_field V := real.discrete_field | |
failed is_def_eq | |
[class_instances] (4) ?x_97 : discrete_field V := rat.discrete_field | |
failed is_def_eq | |
[class_instances] (4) ?x_97 : discrete_field V := @discrete_linear_ordered_field.to_discrete_field ?x_101 ?x_102 | |
[class_instances] (5) ?x_102 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_102 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (4) ?x_97 : discrete_field V := @normed_field.to_discrete_field ?x_99 ?x_100 | |
[class_instances] (5) ?x_100 : normed_field V := _inst_1 | |
failed is_def_eq | |
[class_instances] (5) ?x_100 : normed_field V := rat.normed_field | |
failed is_def_eq | |
[class_instances] (5) ?x_100 : normed_field V := normed_field.normed_field | |
failed is_def_eq | |
[class_instances] (5) ?x_100 : normed_field V := @nondiscrete_normed_field.to_normed_field ?x_101 ?x_102 | |
[class_instances] (6) ?x_102 : nondiscrete_normed_field V := rat.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_102 : nondiscrete_normed_field V := normed_field.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (3) ?x_95 : integral_domain V := @linear_ordered_comm_ring.to_integral_domain ?x_96 ?x_97 | |
[class_instances] (4) ?x_97 : linear_ordered_comm_ring V := real.linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (4) ?x_97 : linear_ordered_comm_ring V := rat.linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (4) ?x_97 : linear_ordered_comm_ring V := @decidable_linear_ordered_comm_ring.to_linear_ordered_comm_ring ?x_98 ?x_99 | |
[class_instances] (5) ?x_99 : decidable_linear_ordered_comm_ring V := real.decidable_linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (5) ?x_99 : decidable_linear_ordered_comm_ring V := rat.decidable_linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (5) ?x_99 : decidable_linear_ordered_comm_ring V := int.decidable_linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (5) ?x_99 : decidable_linear_ordered_comm_ring V := @discrete_linear_ordered_field.to_decidable_linear_ordered_comm_ring ?x_100 ?x_101 | |
[class_instances] (6) ?x_101 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_101 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_99 : decidable_linear_ordered_comm_ring V := @linear_nonneg_ring.to_decidable_linear_ordered_comm_ring ?x_100 ?x_101 ?x_102 ?x_103 | |
[class_instances] (1) ?x_24 : ring V := @division_ring.to_ring ?x_92 ?x_93 | |
[class_instances] (2) ?x_93 : division_ring V := real.division_ring | |
failed is_def_eq | |
[class_instances] (2) ?x_93 : division_ring V := rat.division_ring | |
failed is_def_eq | |
[class_instances] (2) ?x_93 : division_ring V := @field.to_division_ring ?x_94 ?x_95 | |
[class_instances] (3) ?x_95 : field V := real.field | |
failed is_def_eq | |
[class_instances] (3) ?x_95 : field V := rat.field | |
failed is_def_eq | |
[class_instances] (3) ?x_95 : field V := @linear_ordered_field.to_field ?x_96 ?x_97 | |
[class_instances] (4) ?x_97 : linear_ordered_field V := real.linear_ordered_field | |
failed is_def_eq | |
[class_instances] (4) ?x_97 : linear_ordered_field V := rat.linear_ordered_field | |
failed is_def_eq | |
[class_instances] (4) ?x_97 : linear_ordered_field V := @discrete_linear_ordered_field.to_linear_ordered_field ?x_98 ?x_99 | |
[class_instances] (5) ?x_99 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_99 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (3) ?x_95 : field V := @discrete_field.to_field ?x_96 ?x_97 | |
[class_instances] (4) ?x_97 : discrete_field V := complex.discrete_field | |
failed is_def_eq | |
[class_instances] (4) ?x_97 : discrete_field V := @local_ring.residue_field.discrete_field ?x_98 ?x_99 | |
failed is_def_eq | |
[class_instances] (4) ?x_97 : discrete_field V := real.discrete_field | |
failed is_def_eq | |
[class_instances] (4) ?x_97 : discrete_field V := rat.discrete_field | |
failed is_def_eq | |
[class_instances] (4) ?x_97 : discrete_field V := @discrete_linear_ordered_field.to_discrete_field ?x_100 ?x_101 | |
[class_instances] (5) ?x_101 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_101 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (4) ?x_97 : discrete_field V := @normed_field.to_discrete_field ?x_98 ?x_99 | |
[class_instances] (5) ?x_99 : normed_field V := _inst_1 | |
failed is_def_eq | |
[class_instances] (5) ?x_99 : normed_field V := rat.normed_field | |
failed is_def_eq | |
[class_instances] (5) ?x_99 : normed_field V := normed_field.normed_field | |
failed is_def_eq | |
[class_instances] (5) ?x_99 : normed_field V := @nondiscrete_normed_field.to_normed_field ?x_100 ?x_101 | |
[class_instances] (6) ?x_101 : nondiscrete_normed_field V := rat.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_101 : nondiscrete_normed_field V := normed_field.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := @ordered_ring.to_ring ?x_92 ?x_93 | |
[class_instances] (2) ?x_93 : ordered_ring V := real.ordered_ring | |
failed is_def_eq | |
[class_instances] (2) ?x_93 : ordered_ring V := rat.ordered_ring | |
failed is_def_eq | |
[class_instances] (2) ?x_93 : ordered_ring V := @nonneg_ring.to_ordered_ring ?x_94 ?x_95 | |
[class_instances] (3) ?x_95 : nonneg_ring V := @linear_nonneg_ring.to_nonneg_ring ?x_96 ?x_97 | |
[class_instances] (2) ?x_93 : ordered_ring V := @linear_ordered_ring.to_ordered_ring ?x_94 ?x_95 | |
[class_instances] (3) ?x_95 : linear_ordered_ring V := real.linear_ordered_ring | |
failed is_def_eq | |
[class_instances] (3) ?x_95 : linear_ordered_ring V := rat.linear_ordered_ring | |
failed is_def_eq | |
[class_instances] (3) ?x_95 : linear_ordered_ring V := @linear_ordered_field.to_linear_ordered_ring ?x_96 ?x_97 | |
[class_instances] (4) ?x_97 : linear_ordered_field V := real.linear_ordered_field | |
failed is_def_eq | |
[class_instances] (4) ?x_97 : linear_ordered_field V := rat.linear_ordered_field | |
failed is_def_eq | |
[class_instances] (4) ?x_97 : linear_ordered_field V := @discrete_linear_ordered_field.to_linear_ordered_field ?x_98 ?x_99 | |
[class_instances] (5) ?x_99 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_99 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (3) ?x_95 : linear_ordered_ring V := @linear_nonneg_ring.to_linear_ordered_ring ?x_96 ?x_97 | |
[class_instances] (3) ?x_95 : linear_ordered_ring V := @linear_ordered_comm_ring.to_linear_ordered_ring ?x_96 ?x_97 | |
[class_instances] (4) ?x_97 : linear_ordered_comm_ring V := real.linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (4) ?x_97 : linear_ordered_comm_ring V := rat.linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (4) ?x_97 : linear_ordered_comm_ring V := @decidable_linear_ordered_comm_ring.to_linear_ordered_comm_ring ?x_98 ?x_99 | |
[class_instances] (5) ?x_99 : decidable_linear_ordered_comm_ring V := real.decidable_linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (5) ?x_99 : decidable_linear_ordered_comm_ring V := rat.decidable_linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (5) ?x_99 : decidable_linear_ordered_comm_ring V := int.decidable_linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (5) ?x_99 : decidable_linear_ordered_comm_ring V := @discrete_linear_ordered_field.to_decidable_linear_ordered_comm_ring ?x_100 ?x_101 | |
[class_instances] (6) ?x_101 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_101 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_99 : decidable_linear_ordered_comm_ring V := @linear_nonneg_ring.to_decidable_linear_ordered_comm_ring ?x_100 ?x_101 ?x_102 ?x_103 | |
[class_instances] (1) ?x_24 : ring V := @comm_ring.to_ring ?x_92 ?x_93 | |
[class_instances] (2) ?x_93 : comm_ring V := @subalgebra.comm_ring ?x_94 ?x_95 ?x_96 ?x_97 ?x_98 ?x_99 | |
failed is_def_eq | |
[class_instances] (2) ?x_93 : comm_ring V := @algebra.comap.comm_ring ?x_100 ?x_101 ?x_102 ?x_103 ?x_104 ?x_105 ?x_106 ?x_107 | |
failed is_def_eq | |
[class_instances] (2) ?x_93 : comm_ring V := @free_abelian_group.comm_ring ?x_108 ?x_109 | |
failed is_def_eq | |
[class_instances] (2) ?x_93 : comm_ring V := @mv_polynomial.comm_ring ?x_110 ?x_111 ?x_112 | |
failed is_def_eq | |
[class_instances] (2) ?x_93 : comm_ring V := @polynomial.comm_ring ?x_113 ?x_114 | |
failed is_def_eq | |
[class_instances] (2) ?x_93 : comm_ring V := complex.comm_ring | |
failed is_def_eq | |
[class_instances] (2) ?x_93 : comm_ring V := @ideal.quotient.comm_ring ?x_115 ?x_116 ?x_117 | |
failed is_def_eq | |
[class_instances] (2) ?x_93 : comm_ring V := real.comm_ring | |
failed is_def_eq | |
[class_instances] (2) ?x_93 : comm_ring V := @cau_seq.completion.comm_ring ?x_118 ?x_119 ?x_120 ?x_121 ?x_122 ?x_123 | |
failed is_def_eq | |
[class_instances] (2) ?x_93 : comm_ring V := @cau_seq.comm_ring ?x_124 ?x_125 ?x_126 ?x_127 ?x_128 ?x_129 | |
failed is_def_eq | |
[class_instances] (2) ?x_93 : comm_ring V := @finsupp.comm_ring ?x_130 ?x_131 ?x_132 ?x_133 | |
failed is_def_eq | |
[class_instances] (2) ?x_93 : comm_ring V := @prod.comm_ring ?x_134 ?x_135 ?x_136 ?x_137 | |
failed is_def_eq | |
[class_instances] (2) ?x_93 : comm_ring V := @pi.comm_ring ?x_138 ?x_139 ?x_140 | |
failed is_def_eq | |
[class_instances] (2) ?x_93 : comm_ring V := @subtype.comm_ring ?x_141 ?x_142 ?x_143 ?x_144 | |
failed is_def_eq | |
[class_instances] (2) ?x_93 : comm_ring V := @subset.comm_ring ?x_145 ?x_146 ?x_147 ?x_148 | |
failed is_def_eq | |
[class_instances] (2) ?x_93 : comm_ring V := rat.comm_ring | |
failed is_def_eq | |
[class_instances] (2) ?x_93 : comm_ring V := int.comm_ring | |
failed is_def_eq | |
[class_instances] (2) ?x_93 : comm_ring V := @nonzero_comm_ring.to_comm_ring ?x_149 ?x_150 | |
[class_instances] (3) ?x_150 : nonzero_comm_ring V := @polynomial.nonzero_comm_ring ?x_151 ?x_152 | |
failed is_def_eq | |
[class_instances] (3) ?x_150 : nonzero_comm_ring V := real.nonzero_comm_ring | |
failed is_def_eq | |
[class_instances] (3) ?x_150 : nonzero_comm_ring V := @prod.nonzero_comm_ring ?x_153 ?x_154 ?x_155 ?x_156 | |
failed is_def_eq | |
[class_instances] (3) ?x_150 : nonzero_comm_ring V := rat.nonzero_comm_ring | |
failed is_def_eq | |
[class_instances] (3) ?x_150 : nonzero_comm_ring V := @euclidean_domain.to_nonzero_comm_ring ?x_157 ?x_158 | |
[class_instances] (4) ?x_158 : euclidean_domain V := @polynomial.euclidean_domain ?x_159 ?x_160 | |
failed is_def_eq | |
[class_instances] (4) ?x_158 : euclidean_domain V := int.euclidean_domain | |
failed is_def_eq | |
[class_instances] (4) ?x_158 : euclidean_domain V := @discrete_field.to_euclidean_domain ?x_161 ?x_162 | |
[class_instances] (5) ?x_162 : discrete_field V := complex.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_162 : discrete_field V := @local_ring.residue_field.discrete_field ?x_163 ?x_164 | |
failed is_def_eq | |
[class_instances] (5) ?x_162 : discrete_field V := real.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_162 : discrete_field V := rat.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_162 : discrete_field V := @discrete_linear_ordered_field.to_discrete_field ?x_165 ?x_166 | |
[class_instances] (6) ?x_166 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_166 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_162 : discrete_field V := @normed_field.to_discrete_field ?x_163 ?x_164 | |
[class_instances] (6) ?x_164 : normed_field V := _inst_1 | |
failed is_def_eq | |
[class_instances] (6) ?x_164 : normed_field V := rat.normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_164 : normed_field V := normed_field.normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_164 : normed_field V := @nondiscrete_normed_field.to_normed_field ?x_165 ?x_166 | |
[class_instances] (7) ?x_166 : nondiscrete_normed_field V := rat.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (7) ?x_166 : nondiscrete_normed_field V := normed_field.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (3) ?x_150 : nonzero_comm_ring V := @local_ring.to_nonzero_comm_ring ?x_151 ?x_152 | |
[class_instances] (4) ?x_152 : local_ring V := @discrete_field.local_ring ?x_153 ?x_154 | |
[class_instances] (5) ?x_154 : discrete_field V := complex.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_154 : discrete_field V := @local_ring.residue_field.discrete_field ?x_155 ?x_156 | |
failed is_def_eq | |
[class_instances] (5) ?x_154 : discrete_field V := real.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_154 : discrete_field V := rat.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_154 : discrete_field V := @discrete_linear_ordered_field.to_discrete_field ?x_157 ?x_158 | |
[class_instances] (6) ?x_158 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_158 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_154 : discrete_field V := @normed_field.to_discrete_field ?x_155 ?x_156 | |
[class_instances] (6) ?x_156 : normed_field V := _inst_1 | |
failed is_def_eq | |
[class_instances] (6) ?x_156 : normed_field V := rat.normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_156 : normed_field V := normed_field.normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_156 : normed_field V := @nondiscrete_normed_field.to_normed_field ?x_157 ?x_158 | |
[class_instances] (7) ?x_158 : nondiscrete_normed_field V := rat.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (7) ?x_158 : nondiscrete_normed_field V := normed_field.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (3) ?x_150 : nonzero_comm_ring V := @integral_domain.to_nonzero_comm_ring ?x_151 ?x_152 | |
[class_instances] (4) ?x_152 : integral_domain V := @polynomial.integral_domain ?x_153 ?x_154 | |
failed is_def_eq | |
[class_instances] (4) ?x_152 : integral_domain V := @ideal.quotient.integral_domain ?x_155 ?x_156 ?x_157 ?x_158 | |
failed is_def_eq | |
[class_instances] (4) ?x_152 : integral_domain V := real.integral_domain | |
failed is_def_eq | |
[class_instances] (4) ?x_152 : integral_domain V := @subring.domain ?x_159 ?x_160 ?x_161 ?x_162 | |
failed is_def_eq | |
[class_instances] (4) ?x_152 : integral_domain V := rat.integral_domain | |
failed is_def_eq | |
[class_instances] (4) ?x_152 : integral_domain V := @euclidean_domain.integral_domain ?x_163 ?x_164 | |
[class_instances] (5) ?x_164 : euclidean_domain V := @polynomial.euclidean_domain ?x_165 ?x_166 | |
failed is_def_eq | |
[class_instances] (5) ?x_164 : euclidean_domain V := int.euclidean_domain | |
failed is_def_eq | |
[class_instances] (5) ?x_164 : euclidean_domain V := @discrete_field.to_euclidean_domain ?x_167 ?x_168 | |
[class_instances] (6) ?x_168 : discrete_field V := complex.discrete_field | |
failed is_def_eq | |
[class_instances] (6) ?x_168 : discrete_field V := @local_ring.residue_field.discrete_field ?x_169 ?x_170 | |
failed is_def_eq | |
[class_instances] (6) ?x_168 : discrete_field V := real.discrete_field | |
failed is_def_eq | |
[class_instances] (6) ?x_168 : discrete_field V := rat.discrete_field | |
failed is_def_eq | |
[class_instances] (6) ?x_168 : discrete_field V := @discrete_linear_ordered_field.to_discrete_field ?x_171 ?x_172 | |
[class_instances] (7) ?x_172 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (7) ?x_172 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_168 : discrete_field V := @normed_field.to_discrete_field ?x_169 ?x_170 | |
[class_instances] (7) ?x_170 : normed_field V := _inst_1 | |
failed is_def_eq | |
[class_instances] (7) ?x_170 : normed_field V := rat.normed_field | |
failed is_def_eq | |
[class_instances] (7) ?x_170 : normed_field V := normed_field.normed_field | |
failed is_def_eq | |
[class_instances] (7) ?x_170 : normed_field V := @nondiscrete_normed_field.to_normed_field ?x_171 ?x_172 | |
[class_instances] (8) ?x_172 : nondiscrete_normed_field V := rat.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (8) ?x_172 : nondiscrete_normed_field V := normed_field.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (4) ?x_152 : integral_domain V := @normalization_domain.to_integral_domain ?x_153 ?x_154 | |
[class_instances] (5) ?x_154 : normalization_domain V := @polynomial.normalization_domain ?x_155 ?x_156 | |
failed is_def_eq | |
[class_instances] (5) ?x_154 : normalization_domain V := int.normalization_domain | |
failed is_def_eq | |
[class_instances] (5) ?x_154 : normalization_domain V := @gcd_domain.to_normalization_domain ?x_157 ?x_158 | |
[class_instances] (6) ?x_158 : gcd_domain V := int.gcd_domain | |
failed is_def_eq | |
[class_instances] (4) ?x_152 : integral_domain V := @field.to_integral_domain ?x_153 ?x_154 | |
[class_instances] (5) ?x_154 : field V := real.field | |
failed is_def_eq | |
[class_instances] (5) ?x_154 : field V := rat.field | |
failed is_def_eq | |
[class_instances] (5) ?x_154 : field V := @linear_ordered_field.to_field ?x_155 ?x_156 | |
[class_instances] (6) ?x_156 : linear_ordered_field V := real.linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_156 : linear_ordered_field V := rat.linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_156 : linear_ordered_field V := @discrete_linear_ordered_field.to_linear_ordered_field ?x_157 ?x_158 | |
[class_instances] (7) ?x_158 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (7) ?x_158 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_154 : field V := @discrete_field.to_field ?x_155 ?x_156 | |
[class_instances] (6) ?x_156 : discrete_field V := complex.discrete_field | |
failed is_def_eq | |
[class_instances] (6) ?x_156 : discrete_field V := @local_ring.residue_field.discrete_field ?x_157 ?x_158 | |
failed is_def_eq | |
[class_instances] (6) ?x_156 : discrete_field V := real.discrete_field | |
failed is_def_eq | |
[class_instances] (6) ?x_156 : discrete_field V := rat.discrete_field | |
failed is_def_eq | |
[class_instances] (6) ?x_156 : discrete_field V := @discrete_linear_ordered_field.to_discrete_field ?x_159 ?x_160 | |
[class_instances] (7) ?x_160 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (7) ?x_160 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_156 : discrete_field V := @normed_field.to_discrete_field ?x_157 ?x_158 | |
[class_instances] (7) ?x_158 : normed_field V := _inst_1 | |
failed is_def_eq | |
[class_instances] (7) ?x_158 : normed_field V := rat.normed_field | |
failed is_def_eq | |
[class_instances] (7) ?x_158 : normed_field V := normed_field.normed_field | |
failed is_def_eq | |
[class_instances] (7) ?x_158 : normed_field V := @nondiscrete_normed_field.to_normed_field ?x_159 ?x_160 | |
[class_instances] (8) ?x_160 : nondiscrete_normed_field V := rat.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (8) ?x_160 : nondiscrete_normed_field V := normed_field.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (4) ?x_152 : integral_domain V := @discrete_field.to_integral_domain ?x_153 ?x_154 ?x_155 | |
[class_instances] (5) ?x_154 : discrete_field V := complex.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_154 : discrete_field V := @local_ring.residue_field.discrete_field ?x_156 ?x_157 | |
failed is_def_eq | |
[class_instances] (5) ?x_154 : discrete_field V := real.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_154 : discrete_field V := rat.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_154 : discrete_field V := @discrete_linear_ordered_field.to_discrete_field ?x_158 ?x_159 | |
[class_instances] (6) ?x_159 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_159 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_154 : discrete_field V := @normed_field.to_discrete_field ?x_156 ?x_157 | |
[class_instances] (6) ?x_157 : normed_field V := _inst_1 | |
failed is_def_eq | |
[class_instances] (6) ?x_157 : normed_field V := rat.normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_157 : normed_field V := normed_field.normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_157 : normed_field V := @nondiscrete_normed_field.to_normed_field ?x_158 ?x_159 | |
[class_instances] (7) ?x_159 : nondiscrete_normed_field V := rat.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (7) ?x_159 : nondiscrete_normed_field V := normed_field.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (4) ?x_152 : integral_domain V := @linear_ordered_comm_ring.to_integral_domain ?x_153 ?x_154 | |
[class_instances] (5) ?x_154 : linear_ordered_comm_ring V := real.linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (5) ?x_154 : linear_ordered_comm_ring V := rat.linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (5) ?x_154 : linear_ordered_comm_ring V := @decidable_linear_ordered_comm_ring.to_linear_ordered_comm_ring ?x_155 ?x_156 | |
[class_instances] (6) ?x_156 : decidable_linear_ordered_comm_ring V := real.decidable_linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (6) ?x_156 : decidable_linear_ordered_comm_ring V := rat.decidable_linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (6) ?x_156 : decidable_linear_ordered_comm_ring V := int.decidable_linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (6) ?x_156 : decidable_linear_ordered_comm_ring V := @discrete_linear_ordered_field.to_decidable_linear_ordered_comm_ring ?x_157 ?x_158 | |
[class_instances] (7) ?x_158 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (7) ?x_158 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_156 : decidable_linear_ordered_comm_ring V := @linear_nonneg_ring.to_decidable_linear_ordered_comm_ring ?x_157 ?x_158 ?x_159 ?x_160 | |
[class_instances] (2) ?x_93 : comm_ring V := @field.to_comm_ring ?x_94 ?x_95 | |
[class_instances] (3) ?x_95 : field V := real.field | |
failed is_def_eq | |
[class_instances] (3) ?x_95 : field V := rat.field | |
failed is_def_eq | |
[class_instances] (3) ?x_95 : field V := @linear_ordered_field.to_field ?x_96 ?x_97 | |
[class_instances] (4) ?x_97 : linear_ordered_field V := real.linear_ordered_field | |
failed is_def_eq | |
[class_instances] (4) ?x_97 : linear_ordered_field V := rat.linear_ordered_field | |
failed is_def_eq | |
[class_instances] (4) ?x_97 : linear_ordered_field V := @discrete_linear_ordered_field.to_linear_ordered_field ?x_98 ?x_99 | |
[class_instances] (5) ?x_99 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_99 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (3) ?x_95 : field V := @discrete_field.to_field ?x_96 ?x_97 | |
[class_instances] (4) ?x_97 : discrete_field V := complex.discrete_field | |
failed is_def_eq | |
[class_instances] (4) ?x_97 : discrete_field V := @local_ring.residue_field.discrete_field ?x_98 ?x_99 | |
failed is_def_eq | |
[class_instances] (4) ?x_97 : discrete_field V := real.discrete_field | |
failed is_def_eq | |
[class_instances] (4) ?x_97 : discrete_field V := rat.discrete_field | |
failed is_def_eq | |
[class_instances] (4) ?x_97 : discrete_field V := @discrete_linear_ordered_field.to_discrete_field ?x_100 ?x_101 | |
[class_instances] (5) ?x_101 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_101 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (4) ?x_97 : discrete_field V := @normed_field.to_discrete_field ?x_98 ?x_99 | |
[class_instances] (5) ?x_99 : normed_field V := _inst_1 | |
failed is_def_eq | |
[class_instances] (5) ?x_99 : normed_field V := rat.normed_field | |
failed is_def_eq | |
[class_instances] (5) ?x_99 : normed_field V := normed_field.normed_field | |
failed is_def_eq | |
[class_instances] (5) ?x_99 : normed_field V := @nondiscrete_normed_field.to_normed_field ?x_100 ?x_101 | |
[class_instances] (6) ?x_101 : nondiscrete_normed_field V := rat.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_101 : nondiscrete_normed_field V := normed_field.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (2) ?x_93 : comm_ring V := @integral_domain.to_comm_ring ?x_94 ?x_95 | |
[class_instances] (3) ?x_95 : integral_domain V := @polynomial.integral_domain ?x_96 ?x_97 | |
failed is_def_eq | |
[class_instances] (3) ?x_95 : integral_domain V := @ideal.quotient.integral_domain ?x_98 ?x_99 ?x_100 ?x_101 | |
failed is_def_eq | |
[class_instances] (3) ?x_95 : integral_domain V := real.integral_domain | |
failed is_def_eq | |
[class_instances] (3) ?x_95 : integral_domain V := @subring.domain ?x_102 ?x_103 ?x_104 ?x_105 | |
failed is_def_eq | |
[class_instances] (3) ?x_95 : integral_domain V := rat.integral_domain | |
failed is_def_eq | |
[class_instances] (3) ?x_95 : integral_domain V := @euclidean_domain.integral_domain ?x_106 ?x_107 | |
[class_instances] (4) ?x_107 : euclidean_domain V := @polynomial.euclidean_domain ?x_108 ?x_109 | |
failed is_def_eq | |
[class_instances] (4) ?x_107 : euclidean_domain V := int.euclidean_domain | |
failed is_def_eq | |
[class_instances] (4) ?x_107 : euclidean_domain V := @discrete_field.to_euclidean_domain ?x_110 ?x_111 | |
[class_instances] (5) ?x_111 : discrete_field V := complex.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_111 : discrete_field V := @local_ring.residue_field.discrete_field ?x_112 ?x_113 | |
failed is_def_eq | |
[class_instances] (5) ?x_111 : discrete_field V := real.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_111 : discrete_field V := rat.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_111 : discrete_field V := @discrete_linear_ordered_field.to_discrete_field ?x_114 ?x_115 | |
[class_instances] (6) ?x_115 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_115 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_111 : discrete_field V := @normed_field.to_discrete_field ?x_112 ?x_113 | |
[class_instances] (6) ?x_113 : normed_field V := _inst_1 | |
failed is_def_eq | |
[class_instances] (6) ?x_113 : normed_field V := rat.normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_113 : normed_field V := normed_field.normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_113 : normed_field V := @nondiscrete_normed_field.to_normed_field ?x_114 ?x_115 | |
[class_instances] (7) ?x_115 : nondiscrete_normed_field V := rat.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (7) ?x_115 : nondiscrete_normed_field V := normed_field.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (3) ?x_95 : integral_domain V := @normalization_domain.to_integral_domain ?x_96 ?x_97 | |
[class_instances] (4) ?x_97 : normalization_domain V := @polynomial.normalization_domain ?x_98 ?x_99 | |
failed is_def_eq | |
[class_instances] (4) ?x_97 : normalization_domain V := int.normalization_domain | |
failed is_def_eq | |
[class_instances] (4) ?x_97 : normalization_domain V := @gcd_domain.to_normalization_domain ?x_100 ?x_101 | |
[class_instances] (5) ?x_101 : gcd_domain V := int.gcd_domain | |
failed is_def_eq | |
[class_instances] (3) ?x_95 : integral_domain V := @field.to_integral_domain ?x_96 ?x_97 | |
[class_instances] (4) ?x_97 : field V := real.field | |
failed is_def_eq | |
[class_instances] (4) ?x_97 : field V := rat.field | |
failed is_def_eq | |
[class_instances] (4) ?x_97 : field V := @linear_ordered_field.to_field ?x_98 ?x_99 | |
[class_instances] (5) ?x_99 : linear_ordered_field V := real.linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_99 : linear_ordered_field V := rat.linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_99 : linear_ordered_field V := @discrete_linear_ordered_field.to_linear_ordered_field ?x_100 ?x_101 | |
[class_instances] (6) ?x_101 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_101 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (4) ?x_97 : field V := @discrete_field.to_field ?x_98 ?x_99 | |
[class_instances] (5) ?x_99 : discrete_field V := complex.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_99 : discrete_field V := @local_ring.residue_field.discrete_field ?x_100 ?x_101 | |
failed is_def_eq | |
[class_instances] (5) ?x_99 : discrete_field V := real.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_99 : discrete_field V := rat.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_99 : discrete_field V := @discrete_linear_ordered_field.to_discrete_field ?x_102 ?x_103 | |
[class_instances] (6) ?x_103 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_103 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_99 : discrete_field V := @normed_field.to_discrete_field ?x_100 ?x_101 | |
[class_instances] (6) ?x_101 : normed_field V := _inst_1 | |
failed is_def_eq | |
[class_instances] (6) ?x_101 : normed_field V := rat.normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_101 : normed_field V := normed_field.normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_101 : normed_field V := @nondiscrete_normed_field.to_normed_field ?x_102 ?x_103 | |
[class_instances] (7) ?x_103 : nondiscrete_normed_field V := rat.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (7) ?x_103 : nondiscrete_normed_field V := normed_field.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (3) ?x_95 : integral_domain V := @discrete_field.to_integral_domain ?x_96 ?x_97 ?x_98 | |
[class_instances] (4) ?x_97 : discrete_field V := complex.discrete_field | |
failed is_def_eq | |
[class_instances] (4) ?x_97 : discrete_field V := @local_ring.residue_field.discrete_field ?x_99 ?x_100 | |
failed is_def_eq | |
[class_instances] (4) ?x_97 : discrete_field V := real.discrete_field | |
failed is_def_eq | |
[class_instances] (4) ?x_97 : discrete_field V := rat.discrete_field | |
failed is_def_eq | |
[class_instances] (4) ?x_97 : discrete_field V := @discrete_linear_ordered_field.to_discrete_field ?x_101 ?x_102 | |
[class_instances] (5) ?x_102 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_102 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (4) ?x_97 : discrete_field V := @normed_field.to_discrete_field ?x_99 ?x_100 | |
[class_instances] (5) ?x_100 : normed_field V := _inst_1 | |
failed is_def_eq | |
[class_instances] (5) ?x_100 : normed_field V := rat.normed_field | |
failed is_def_eq | |
[class_instances] (5) ?x_100 : normed_field V := normed_field.normed_field | |
failed is_def_eq | |
[class_instances] (5) ?x_100 : normed_field V := @nondiscrete_normed_field.to_normed_field ?x_101 ?x_102 | |
[class_instances] (6) ?x_102 : nondiscrete_normed_field V := rat.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_102 : nondiscrete_normed_field V := normed_field.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (3) ?x_95 : integral_domain V := @linear_ordered_comm_ring.to_integral_domain ?x_96 ?x_97 | |
[class_instances] (4) ?x_97 : linear_ordered_comm_ring V := real.linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (4) ?x_97 : linear_ordered_comm_ring V := rat.linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (4) ?x_97 : linear_ordered_comm_ring V := @decidable_linear_ordered_comm_ring.to_linear_ordered_comm_ring ?x_98 ?x_99 | |
[class_instances] (5) ?x_99 : decidable_linear_ordered_comm_ring V := real.decidable_linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (5) ?x_99 : decidable_linear_ordered_comm_ring V := rat.decidable_linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (5) ?x_99 : decidable_linear_ordered_comm_ring V := int.decidable_linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (5) ?x_99 : decidable_linear_ordered_comm_ring V := @discrete_linear_ordered_field.to_decidable_linear_ordered_comm_ring ?x_100 ?x_101 | |
[class_instances] (6) ?x_101 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_101 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_99 : decidable_linear_ordered_comm_ring V := @linear_nonneg_ring.to_decidable_linear_ordered_comm_ring ?x_100 ?x_101 ?x_102 ?x_103 | |
[class_instances] (5) ?x_91 : normed_field k := rat.normed_field | |
failed is_def_eq | |
[class_instances] (5) ?x_91 : normed_field k := normed_field.normed_field | |
failed is_def_eq | |
[class_instances] (5) ?x_91 : normed_field k := @nondiscrete_normed_field.to_normed_field ?x_92 ?x_93 | |
[class_instances] (6) ?x_93 : nondiscrete_normed_field k := rat.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_93 : nondiscrete_normed_field k := normed_field.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (5) ?x_89 : normed_field k := rat.normed_field | |
failed is_def_eq | |
[class_instances] (5) ?x_89 : normed_field k := normed_field.normed_field | |
failed is_def_eq | |
[class_instances] (5) ?x_89 : normed_field k := @nondiscrete_normed_field.to_normed_field ?x_90 ?x_91 | |
[class_instances] (6) ?x_91 : nondiscrete_normed_field k := rat.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_91 : nondiscrete_normed_field k := normed_field.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (3) ?x_84 : integral_domain k := @linear_ordered_comm_ring.to_integral_domain ?x_85 ?x_86 | |
[class_instances] (4) ?x_86 : linear_ordered_comm_ring k := real.linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (4) ?x_86 : linear_ordered_comm_ring k := rat.linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (4) ?x_86 : linear_ordered_comm_ring k := @decidable_linear_ordered_comm_ring.to_linear_ordered_comm_ring ?x_87 ?x_88 | |
[class_instances] (5) ?x_88 : decidable_linear_ordered_comm_ring k := real.decidable_linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (5) ?x_88 : decidable_linear_ordered_comm_ring k := rat.decidable_linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (5) ?x_88 : decidable_linear_ordered_comm_ring k := int.decidable_linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (5) ?x_88 : decidable_linear_ordered_comm_ring k := @discrete_linear_ordered_field.to_decidable_linear_ordered_comm_ring ?x_89 ?x_90 | |
[class_instances] (6) ?x_90 : discrete_linear_ordered_field k := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_90 : discrete_linear_ordered_field k := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_88 : decidable_linear_ordered_comm_ring k := @linear_nonneg_ring.to_decidable_linear_ordered_comm_ring ?x_89 ?x_90 ?x_91 ?x_92 | |
[class_instances] (1) ?x_23 : comm_ring k := @field.to_comm_ring ?x_26 ?x_27 | |
[class_instances] (2) ?x_27 : field k := real.field | |
failed is_def_eq | |
[class_instances] (2) ?x_27 : field k := rat.field | |
failed is_def_eq | |
[class_instances] (2) ?x_27 : field k := @linear_ordered_field.to_field ?x_28 ?x_29 | |
[class_instances] (3) ?x_29 : linear_ordered_field k := real.linear_ordered_field | |
failed is_def_eq | |
[class_instances] (3) ?x_29 : linear_ordered_field k := rat.linear_ordered_field | |
failed is_def_eq | |
[class_instances] (3) ?x_29 : linear_ordered_field k := @discrete_linear_ordered_field.to_linear_ordered_field ?x_30 ?x_31 | |
[class_instances] (4) ?x_31 : discrete_linear_ordered_field k := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (4) ?x_31 : discrete_linear_ordered_field k := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (2) ?x_27 : field k := @discrete_field.to_field ?x_28 ?x_29 | |
[class_instances] (3) ?x_29 : discrete_field k := complex.discrete_field | |
failed is_def_eq | |
[class_instances] (3) ?x_29 : discrete_field k := @local_ring.residue_field.discrete_field ?x_30 ?x_31 | |
failed is_def_eq | |
[class_instances] (3) ?x_29 : discrete_field k := real.discrete_field | |
failed is_def_eq | |
[class_instances] (3) ?x_29 : discrete_field k := rat.discrete_field | |
failed is_def_eq | |
[class_instances] (3) ?x_29 : discrete_field k := @discrete_linear_ordered_field.to_discrete_field ?x_32 ?x_33 | |
[class_instances] (4) ?x_33 : discrete_linear_ordered_field k := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (4) ?x_33 : discrete_linear_ordered_field k := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (3) ?x_29 : discrete_field k := @normed_field.to_discrete_field ?x_30 ?x_31 | |
[class_instances] (4) ?x_31 : normed_field k := _inst_1 | |
[class_instances] (1) ?x_24 : ring V := @continuous_linear_map.ring ?x_32 ?x_33 ?x_34 ?x_35 ?x_36 ?x_37 ?x_38 | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := @subalgebra.ring ?x_39 ?x_40 ?x_41 ?x_42 ?x_43 ?x_44 | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := @algebra.comap.ring ?x_45 ?x_46 ?x_47 ?x_48 ?x_49 ?x_50 ?x_51 ?x_52 | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := @free_abelian_group.ring ?x_53 ?x_54 | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := @matrix.ring ?x_55 ?x_56 ?x_57 ?x_58 ?x_59 | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := @mv_polynomial.ring ?x_60 ?x_61 ?x_62 | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := real.ring | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := @cau_seq.ring ?x_63 ?x_64 ?x_65 ?x_66 ?x_67 ?x_68 | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := @linear_map.endomorphism_ring ?x_69 ?x_70 ?x_71 ?x_72 ?x_73 | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := @finsupp.ring ?x_74 ?x_75 ?x_76 ?x_77 | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := @prod.ring ?x_78 ?x_79 ?x_80 ?x_81 | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := @pi.ring ?x_82 ?x_83 ?x_84 | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := @subtype.ring ?x_85 ?x_86 ?x_87 ?x_88 | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := @subset.ring ?x_89 ?x_90 ?x_91 ?x_92 | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := int.ring | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := @normed_ring.to_ring ?x_93 ?x_94 | |
[class_instances] (2) ?x_94 : normed_ring V := int.normed_ring | |
failed is_def_eq | |
[class_instances] (2) ?x_94 : normed_ring V := @prod.normed_ring ?x_95 ?x_96 ?x_97 ?x_98 | |
failed is_def_eq | |
[class_instances] (2) ?x_94 : normed_ring V := @normed_field.to_normed_ring ?x_99 ?x_100 | |
[class_instances] (3) ?x_100 : normed_field V := _inst_1 | |
failed is_def_eq | |
[class_instances] (3) ?x_100 : normed_field V := rat.normed_field | |
failed is_def_eq | |
[class_instances] (3) ?x_100 : normed_field V := normed_field.normed_field | |
failed is_def_eq | |
[class_instances] (3) ?x_100 : normed_field V := @nondiscrete_normed_field.to_normed_field ?x_101 ?x_102 | |
[class_instances] (4) ?x_102 : nondiscrete_normed_field V := rat.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (4) ?x_102 : nondiscrete_normed_field V := normed_field.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (1) ?x_24 : ring V := @nonneg_ring.to_ring ?x_32 ?x_33 | |
[class_instances] (2) ?x_33 : nonneg_ring V := @linear_nonneg_ring.to_nonneg_ring ?x_34 ?x_35 | |
[class_instances] (1) ?x_24 : ring V := @domain.to_ring ?x_32 ?x_33 | |
[class_instances] (2) ?x_33 : domain V := real.domain | |
failed is_def_eq | |
[class_instances] (2) ?x_33 : domain V := @division_ring.to_domain ?x_34 ?x_35 | |
[class_instances] (3) ?x_35 : division_ring V := real.division_ring | |
failed is_def_eq | |
[class_instances] (3) ?x_35 : division_ring V := rat.division_ring | |
failed is_def_eq | |
[class_instances] (3) ?x_35 : division_ring V := @field.to_division_ring ?x_36 ?x_37 | |
[class_instances] (4) ?x_37 : field V := real.field | |
failed is_def_eq | |
[class_instances] (4) ?x_37 : field V := rat.field | |
failed is_def_eq | |
[class_instances] (4) ?x_37 : field V := @linear_ordered_field.to_field ?x_38 ?x_39 | |
[class_instances] (5) ?x_39 : linear_ordered_field V := real.linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_39 : linear_ordered_field V := rat.linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_39 : linear_ordered_field V := @discrete_linear_ordered_field.to_linear_ordered_field ?x_40 ?x_41 | |
[class_instances] (6) ?x_41 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_41 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (4) ?x_37 : field V := @discrete_field.to_field ?x_38 ?x_39 | |
[class_instances] (5) ?x_39 : discrete_field V := complex.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_39 : discrete_field V := @local_ring.residue_field.discrete_field ?x_40 ?x_41 | |
failed is_def_eq | |
[class_instances] (5) ?x_39 : discrete_field V := real.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_39 : discrete_field V := rat.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_39 : discrete_field V := @discrete_linear_ordered_field.to_discrete_field ?x_42 ?x_43 | |
[class_instances] (6) ?x_43 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_43 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_39 : discrete_field V := @normed_field.to_discrete_field ?x_40 ?x_41 | |
[class_instances] (6) ?x_41 : normed_field V := _inst_1 | |
failed is_def_eq | |
[class_instances] (6) ?x_41 : normed_field V := rat.normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_41 : normed_field V := normed_field.normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_41 : normed_field V := @nondiscrete_normed_field.to_normed_field ?x_42 ?x_43 | |
[class_instances] (7) ?x_43 : nondiscrete_normed_field V := rat.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (7) ?x_43 : nondiscrete_normed_field V := normed_field.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (2) ?x_33 : domain V := @linear_nonneg_ring.to_domain ?x_34 ?x_35 | |
[class_instances] (2) ?x_33 : domain V := @linear_ordered_ring.to_domain ?x_34 ?x_35 | |
[class_instances] (3) ?x_35 : linear_ordered_ring V := real.linear_ordered_ring | |
failed is_def_eq | |
[class_instances] (3) ?x_35 : linear_ordered_ring V := rat.linear_ordered_ring | |
failed is_def_eq | |
[class_instances] (3) ?x_35 : linear_ordered_ring V := @linear_ordered_field.to_linear_ordered_ring ?x_36 ?x_37 | |
[class_instances] (4) ?x_37 : linear_ordered_field V := real.linear_ordered_field | |
failed is_def_eq | |
[class_instances] (4) ?x_37 : linear_ordered_field V := rat.linear_ordered_field | |
failed is_def_eq | |
[class_instances] (4) ?x_37 : linear_ordered_field V := @discrete_linear_ordered_field.to_linear_ordered_field ?x_38 ?x_39 | |
[class_instances] (5) ?x_39 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_39 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (3) ?x_35 : linear_ordered_ring V := @linear_nonneg_ring.to_linear_ordered_ring ?x_36 ?x_37 | |
[class_instances] (3) ?x_35 : linear_ordered_ring V := @linear_ordered_comm_ring.to_linear_ordered_ring ?x_36 ?x_37 | |
[class_instances] (4) ?x_37 : linear_ordered_comm_ring V := real.linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (4) ?x_37 : linear_ordered_comm_ring V := rat.linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (4) ?x_37 : linear_ordered_comm_ring V := @decidable_linear_ordered_comm_ring.to_linear_ordered_comm_ring ?x_38 ?x_39 | |
[class_instances] (5) ?x_39 : decidable_linear_ordered_comm_ring V := real.decidable_linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (5) ?x_39 : decidable_linear_ordered_comm_ring V := rat.decidable_linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (5) ?x_39 : decidable_linear_ordered_comm_ring V := int.decidable_linear_ordered_comm_ring | |
failed is_def_eq | |
[class_instances] (5) ?x_39 : decidable_linear_ordered_comm_ring V := @discrete_linear_ordered_field.to_decidable_linear_ordered_comm_ring ?x_40 ?x_41 | |
[class_instances] (6) ?x_41 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_41 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_39 : decidable_linear_ordered_comm_ring V := @linear_nonneg_ring.to_decidable_linear_ordered_comm_ring ?x_40 ?x_41 ?x_42 ?x_43 | |
[class_instances] (2) ?x_33 : domain V := @integral_domain.to_domain ?x_34 ?x_35 | |
[class_instances] (3) ?x_35 : integral_domain V := @polynomial.integral_domain ?x_36 ?x_37 | |
failed is_def_eq | |
[class_instances] (3) ?x_35 : integral_domain V := @ideal.quotient.integral_domain ?x_38 ?x_39 ?x_40 ?x_41 | |
failed is_def_eq | |
[class_instances] (3) ?x_35 : integral_domain V := real.integral_domain | |
failed is_def_eq | |
[class_instances] (3) ?x_35 : integral_domain V := @subring.domain ?x_42 ?x_43 ?x_44 ?x_45 | |
failed is_def_eq | |
[class_instances] (3) ?x_35 : integral_domain V := rat.integral_domain | |
failed is_def_eq | |
[class_instances] (3) ?x_35 : integral_domain V := @euclidean_domain.integral_domain ?x_46 ?x_47 | |
[class_instances] (4) ?x_47 : euclidean_domain V := @polynomial.euclidean_domain ?x_48 ?x_49 | |
failed is_def_eq | |
[class_instances] (4) ?x_47 : euclidean_domain V := int.euclidean_domain | |
failed is_def_eq | |
[class_instances] (4) ?x_47 : euclidean_domain V := @discrete_field.to_euclidean_domain ?x_50 ?x_51 | |
[class_instances] (5) ?x_51 : discrete_field V := complex.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_51 : discrete_field V := @local_ring.residue_field.discrete_field ?x_52 ?x_53 | |
failed is_def_eq | |
[class_instances] (5) ?x_51 : discrete_field V := real.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_51 : discrete_field V := rat.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_51 : discrete_field V := @discrete_linear_ordered_field.to_discrete_field ?x_54 ?x_55 | |
[class_instances] (6) ?x_55 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_55 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_51 : discrete_field V := @normed_field.to_discrete_field ?x_52 ?x_53 | |
[class_instances] (6) ?x_53 : normed_field V := _inst_1 | |
failed is_def_eq | |
[class_instances] (6) ?x_53 : normed_field V := rat.normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_53 : normed_field V := normed_field.normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_53 : normed_field V := @nondiscrete_normed_field.to_normed_field ?x_54 ?x_55 | |
[class_instances] (7) ?x_55 : nondiscrete_normed_field V := rat.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (7) ?x_55 : nondiscrete_normed_field V := normed_field.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (3) ?x_35 : integral_domain V := @normalization_domain.to_integral_domain ?x_36 ?x_37 | |
[class_instances] (4) ?x_37 : normalization_domain V := @polynomial.normalization_domain ?x_38 ?x_39 | |
failed is_def_eq | |
[class_instances] (4) ?x_37 : normalization_domain V := int.normalization_domain | |
failed is_def_eq | |
[class_instances] (4) ?x_37 : normalization_domain V := @gcd_domain.to_normalization_domain ?x_40 ?x_41 | |
[class_instances] (5) ?x_41 : gcd_domain V := int.gcd_domain | |
failed is_def_eq | |
[class_instances] (3) ?x_35 : integral_domain V := @field.to_integral_domain ?x_36 ?x_37 | |
[class_instances] (4) ?x_37 : field V := real.field | |
failed is_def_eq | |
[class_instances] (4) ?x_37 : field V := rat.field | |
failed is_def_eq | |
[class_instances] (4) ?x_37 : field V := @linear_ordered_field.to_field ?x_38 ?x_39 | |
[class_instances] (5) ?x_39 : linear_ordered_field V := real.linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_39 : linear_ordered_field V := rat.linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_39 : linear_ordered_field V := @discrete_linear_ordered_field.to_linear_ordered_field ?x_40 ?x_41 | |
[class_instances] (6) ?x_41 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_41 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (4) ?x_37 : field V := @discrete_field.to_field ?x_38 ?x_39 | |
[class_instances] (5) ?x_39 : discrete_field V := complex.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_39 : discrete_field V := @local_ring.residue_field.discrete_field ?x_40 ?x_41 | |
failed is_def_eq | |
[class_instances] (5) ?x_39 : discrete_field V := real.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_39 : discrete_field V := rat.discrete_field | |
failed is_def_eq | |
[class_instances] (5) ?x_39 : discrete_field V := @discrete_linear_ordered_field.to_discrete_field ?x_42 ?x_43 | |
[class_instances] (6) ?x_43 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (6) ?x_43 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_39 : discrete_field V := @normed_field.to_discrete_field ?x_40 ?x_41 | |
[class_instances] (6) ?x_41 : normed_field V := _inst_1 | |
failed is_def_eq | |
[class_instances] (6) ?x_41 : normed_field V := rat.normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_41 : normed_field V := normed_field.normed_field | |
failed is_def_eq | |
[class_instances] (6) ?x_41 : normed_field V := @nondiscrete_normed_field.to_normed_field ?x_42 ?x_43 | |
[class_instances] (7) ?x_43 : nondiscrete_normed_field V := rat.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (7) ?x_43 : nondiscrete_normed_field V := normed_field.nondiscrete_normed_field | |
failed is_def_eq | |
[class_instances] (3) ?x_35 : integral_domain V := @discrete_field.to_integral_domain ?x_36 ?x_37 ?x_38 | |
[class_instances] (4) ?x_37 : discrete_field V := complex.discrete_field | |
failed is_def_eq | |
[class_instances] (4) ?x_37 : discrete_field V := @local_ring.residue_field.discrete_field ?x_39 ?x_40 | |
failed is_def_eq | |
[class_instances] (4) ?x_37 : discrete_field V := real.discrete_field | |
failed is_def_eq | |
[class_instances] (4) ?x_37 : discrete_field V := rat.discrete_field | |
failed is_def_eq | |
[class_instances] (4) ?x_37 : discrete_field V := @discrete_linear_ordered_field.to_discrete_field ?x_41 ?x_42 | |
[class_instances] (5) ?x_42 : discrete_linear_ordered_field V := real.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (5) ?x_42 : discrete_linear_ordered_field V := rat.discrete_linear_ordered_field | |
failed is_def_eq | |
[class_instances] (4) ?x_37 : discrete_field V := @normed_field.to_discrete_field ?x_39 ?x_40 | |
[class_instances] (5) ?x_40 : normed_field V := _inst_1 | |
failed is_def_eq | |
[class_instances] (5) ?x_40 : normed_field V := rat.normed_field | |
failed is_def_eq | |
[clas | |
(message too long, truncated at 262144 characters) |
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