# Questions tagged [curry-howard]

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

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### Curry's paradox in Haskell?

Curry's paradox (named after the same person as the present programming language) is a construction possible in a faulty logic that allows one to prove anything.
I know nothing about logic, but how ...

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### Agda – difference between type args on the left and right side of the colon

Following definition compiles and behaves well:
data Eq {lvl} {A : Set lvl} (x : A) : A → Set where
refl : Eq x x
However this one does not compile:
data Eq {lvl} {A : Set lvl} (x : A) (y : A) : ...

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### CoNat : proving that 0 is neutral to the left

I am experimenting with the definition of CoNat taken from this paper by Jesper Cockx and Andreas Abel:
open import Data.Bool
open import Relation.Binary.PropositionalEquality
record CoNat : Set ...

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### Understanding Curry-Howard Isomorphism exercise from Thinking With Types

I've begun reading the book Thinking With Types which is my first foray into type level programming. The author provides an exercise and the solution, and I cannot understand how the solution provided ...

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### Prove exhaustivity of print function based on a string map in Haskell

When I have an "enum" type, that is, an algebraic data type where none of the cases wrap any other data, I commonly like to project a parser/printer off of a mapping to string, to make sure the parser ...

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### Curry-Howard for term synthesis in Isabelle

Say I have proven some basic proposition of intuitionistic propositional logic in Isabelle/HOL:
theorem ‹(A ⟶ B) ⟶ ((B ⟶ C) ⟶ (A ⟶ C))›
proof -
{
assume ‹A ⟶ B›
{
assume ‹B ⟶ C›
...

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### How to prove the principle of explosion (ex falso sequitur quodlibet) in Scala?

How do I show that anything follows from a value of a type with no constructors in Scala? I would like to do a pattern match on the value and have Scala tell me that no patterns can match, but I am ...

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### Why do Leans `Prop`ositions get special treatment?

A question is nagging me since I began going through the interactive Lean tutorial: What is the purpose of the separate Prop hierarchy within Type?
As I understand it now, we have the following ...

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### What is the bottom type?

In wikipedia, the bottom type is simply defined as "the type that has no values". However, if b is this empty type, then the product type (b,b) has no values either, but seems different from b. I ...

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### What's the equivalent of a bug by the Curry-Howard isomorphism?

Simply put, the Curry-Howard correspondence states that a type is a theorem and that a program returning this type is a proof of the corresponding theorem.
The correspondence is based on the ...

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### Could not deduce SingI of predecessor Nat

I am trying to write a weaken function for finite sets of integers. I am using the singletons package. I have defined and promoted addition, subtraction and predecessor functions, as well as proved ...

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### Practical examples of using Void

Edit: By Void, I mean Haskell's Void type, i.e. empty type that cannot have values but undefined.
There is an ongoing discussion on Swift Evolution whether to replace noreturn function attribute with ...

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### De Morgan's Laws in Haskell via the Curry-Howard Correspondence

I implemented three of the four De Morgan's Laws in Haskell:
notAandNotB :: (a -> c, b -> c) -> Either a b -> c
notAandNotB (f, g) (Left x) = f x
notAandNotB (f, g) (Right y) = g y
...

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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 a^...

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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 established ...

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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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203 views

### 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 by ...

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91 views

### 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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202 views

### 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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661 views

### 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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### 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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### 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?