| #!/usr/local/bin/python3 | |
| # Compute algebraic numbers in the complex plane and draw a nice picture | |
| import numpy | |
| import sys | |
| import argparse | |
| import math | |
| import cairo | |
| import pickle |
| (** * General support for creation of dynamic effects *) | |
| (** We show how to use the multicore Ocaml effects to dynamically generate local | |
| effects. Such effects are akin to the Eff resources, and they can be used to | |
| implement ML references. | |
| The code is based on "Eff directly in OCaml" by Oleg Kiselyov and KC | |
| Sivaramakrishnan (http://kcsrk.info/papers/caml-eff17.pdf). It was written by | |
| Andrej Bauer, Oleg Kiselyov, and Stephen Dolan at the Dagstuhl seminar | |
| "Algebraic Effect Handlers go Mainstream". *) |
| (** This code is compatible with Eff 5.0, see http://www.eff-lang.org *) | |
| (** We show that with algebraic effects and handlers a total functional | |
| [(int -> bool) -> bool] has a tree representation. *) | |
| (* A tree representation of a functional. *) | |
| type tree = | |
| | Answer of bool | |
| | Question of int * tree * tree |
| (** An attempt to formalize graphs. *) | |
| Require Import Arith. | |
| (** In order to avoid the intricacies of constructive mathematics, | |
| we consider finite simple graphs whose sets of vertices are | |
| natural numbers 0, 1, , ..., n-1 and the edges form a decidable | |
| relation. *) | |
| (** We shall work a lot with statements of the form |
Official Zermelo-Fraenkel set theory only has the elementhood relation symbol ∈, and nothing else. Other constants, such as ∅, ⊆, ∩, ∪, f[x], etc. can be mechanically eliminated. The result of the elimination is a formula which is logically equivalent to the original, but is more complicated.
This program eliminates constants and function symbols, and generates LaTeX showing the formula before and after the elimination.
| (* An initial attempt at universal algebra in Coq. | |
| Author: Andrej Bauer <Andrej.Bauer@andrej.com> | |
| If someone knows of a less painful way of doing this, please let me know. | |
| We would like to define the notion of an algebra with given operations satisfying given | |
| equations. For example, a group has of three operations (unit, multiplication, inverse) | |
| and five equations (associativity, unit left, unit right, inverse left, inverse right). | |
| *) |
| (* In Andromeda everything the user writes is "meta-level programming. *) | |
| (* ML-level natural numbers *) | |
| mltype rec mlnat = | |
| | zero | |
| | succ of mlnat | |
| end | |
| (* We can use the meta-level numbers to define a program which computes n-fold iterations | |
| of f. Here we give an explicit type of iterate because the ML-type inference cannot tell |
Brouwer's statement "all functions are continuous" can be formulated without reference to topology as follows.
Definition: A functional
f : (N → N) → Nis continuous ata : N → Nwhen there existsm : Nsuch that, for allb : N → N, if∀ k < m, a k = b kthenf a = f b.
Every once in a while I am faced with someone who denies that the rational numbers (or fractions, or pairs of integers) can be put into a bijective correspondence with natural numbers. To deal with the situation, I coded up the bijection. So now I can just say: "Really? Interesting. Please provide a pair of numbers (i,j) which is not enumerated by f, as defined in my gist." I am still waiting for a valid counter-example.
Anyhow, here is a demo of f and g at work. I am using the Python version, but a Haskell variant is included as well.
The 100-th pair is:
>>> f(100)
(10, 4)