The Curry–Howard correspondence is the direct relationship between computer programs and proofs in programming language theory and proof theory.

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Is it possible to randomly generate theorems that are arbitrarily difficult to prove?

If I understand Curry-Howard's isomorphism correctly, every dependent type correspond to a theorem, for which a program implementing it is a proof. That means that any mathematical problem, such as ...
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What is a “roundabout proof” in Propositions as Types by P. Wadler?

In Propositions as Types, it is written: In 1935, at the age of 25, Gentzen15 introduced not one but two new formulations of logic—natural deduction and sequent calculus—that became ...
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Can I tell GHC to arbitrarily select which instance to use, because I don't care?

I have some code like this: {-# OPTIONS_GHC -Wall #-} {-# LANUAGE VariousLanguageExtensionsNoneOfWhichWorked #-} import Control.Applicative import Data.Either import Data.Void class Constructive a ...
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Curry Howard correspondence and equality

A while ago I read that the function type a -> b corresponds to the relation a ≤ b, or is it a ≥ b? This makes sense to me because two types are isomorphic if we have a bijection between them (i.e. ...
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How to encode the axiom of choice in Haskell/Functional programming?

> {-# LANGUAGE RankNTypes #-} I was wondering if there was a way to represent the axiom of choice in haskell and/or some other functional programming language. As we know, false is represented ...
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Implications as functions in Coq?

I read that implications are functions. But I have a hard time trying to understand the example given in the above mentioned page: The proof term for an implication P → Q is a function that takes ...
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Is Curry-Howard correspondent of double negation ((a->r)->r) or ((a->⊥)->⊥)?

Which is the Curry-Howard correspondent of double negation of a; (a -> r) -> r or (a -> ⊥) -> ⊥, or both? Both types can be encoded in Haskell as follows, where ⊥ is encoded as forall b. ...
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Curry-Howard isomorphism definitions in Coq using fun

I'm having some issues with defining in Coq, more specifically when defining using the CHI. I have managed to gain the understanding of basic principals but when I try to define this" ((A -> (A ...
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How or is that possible to prove or falsify `forall (P Q : Prop), (P -> Q) -> (Q -> P) -> P = Q.` in Coq?

I want to prove or falsify forall (P Q : Prop), (P -> Q) -> (Q -> P) -> P = Q. in Coq. Here is my approach. Inductive True2 : Prop := | One : True2 | Two : True2. Lemma True_has_one : ...
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Dependent Types: How is the dependent pair type analogous to a disjoint union?

I've been studying dependent types and I understand the following: Why universal quantification is represented as a dependent function type. ∀(x:A).B(x) means “for all x of type A there is a ...
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How come that we can implement call/cc, but the classical logic (intuitionistic + call/cc) is not constructive?

Intuitionistic logic, being constructive, is the basis for type systems in functional programming. The classical logic is not constructive, in particular the law of excluded middle A ∨ ¬A (or its ...
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Using curry howard to be able to statically ensure two types aren't equal in scala

So I recently read the following blow post: http://www.chuusai.com/2011/06/09/scala-union-types-curry-howard/ And I really appreciated the approach! I am trying to make a function def neq[A,B] = ... ...
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What else can `loeb` function be used for?

I am trying to understand "Löb and möb: strange loops in Haskell", but right now the meaning is sleaping away from me, I just don't see why it could be useful. Just to recall function loeb is defined ...
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309 views

COQ definition curry howard (A -> B -> C) -> (B -> A -> C) using sets

I've been staring this in the face for hours not understanding :( I need to solve some definitions using coq, and I am supposed to do it via the Curry Howard isomorphism. I have read up and still ...
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Can GADTs be used to prove type inequalities in GHC?

So, in my ongoing attempts to half-understand Curry-Howard through small Haskell exercises, I've gotten stuck at this point: {-# LANGUAGE GADTs #-} import Data.Void type Not a = a -> Void -- | ...
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What's the absurd function in Data.Void useful for?

The absurd function in Data.Void has the following signature, where Void is the logically uninhabited type exported by that package: -- | Since 'Void' values logically don't exist, this witnesses the ...
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Is there a Scala function of type `Nothing => A`? Or how to construct one?

Through Curry-Howard isomorphism Scala's Unit corresponds to logical true and Nothing to logical false. The fact that logical true is implied by anything is witnessed by a simple function that just ...
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Constructing efficient monad instances on `Set` (and other containers with constraints) using the continuation monad

Set, similarly to [] has a perfectly defined monadic operations. The problem is that they require that the values satisfy Ord constraint, and so it's impossible to define return and >>= without ...
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I can't get my GADT-based toy Dynamic type to work with parametric types

So in order to help me understand some of the more advanced Haskell/GHC features and concepts, I decided to take a working GADT-based implementation of dynamically typed data and extend it to cover ...
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3answers
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Curry-Howard isomorphism

I've searched around the Internet, and I can't find any explanations of CHI which don't rapidly degenerate into a lecture on logic theory which is drastically over my head. (These people talk as if ...
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What are the most interesting equivalences arising from the Curry-Howard Isomorphism?

I came upon the Curry-Howard Isomorphism relatively late in my programming life, and perhaps this contributes to my being utterly fascinated by it. It implies that for every programming concept there ...
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A question about logic and the Curry-Howard correspondence

Could you please explain me what is the basic connection between the fundamentals of logical programming and the phenomenon of syntactic similarity between type systems and conventional logic?