Questions tagged [church-encoding]

Questions about the Church encoding, a way to represent data using functions, and the Boehm-Berarducci encoding, a transposition of it to a typed setting. For questions primarily about the related Scott and Mogensen-Scott encodings, there is [scott-encoding].

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How to revert beta-reductions to named functions in a lambda calculus-based system?

Well, suppose that I have a set of functional definitions (with a syntax tree) in church encoding : true : λx -> λy -> x false : λx -> λy -> y Giving the definition λx -> λy -> y, ...
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Going from Curry-0, 1, 2, to ...n

Following up from a previous question I asked about writing a curry function, How to create a make-curry function like racket has, I've started writing the fixed case for 0, 1, 2 -- they are very ...
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Understanding church numerals

I'm working my way through SICP, and it gives the following definition for zero for Church Numerals: (define zero (lambda (f) (lambda (x) x))) I have a few questions about that: Why the complicated ...
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How to iterate or repeat untyped function n times?

I'm practicing with OCaml compiler and I'm doing a small assignment where we have to implement Church numerals defined as: zz = pair c0 c0; ss = λp. pair ( snd p) ( plus c1 (snd p)); prd = λm. fst (m ...
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Defining a function to represent integers in Church numerals (DrRacket)

I am trying to define a procedure that takes an integer and returns its representation in Church numerals. Could any one please help me figure out the mistake I am making? The following code it's what ...
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How to define a function with Church numerals in lambda-terms?

How can I express the following function by a lambda term? f(n) = T if n != 0. F if n = 0. n stands for a Church numeral. I know that 0 := λf.λx.x where λx.x is the identity function and all other ...
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How to prove that the Church encoding, forall r. (F r -> r) -> r, gives an initial algebra of the functor F? [closed]

The well-known Church encoding of natural numbers can be generalized to use an arbitrary functor F. The result is the type, call it C, defined by data C = Cfix { run :: forall r. (F r -> r) -> ...
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How to return the Church number

I want to change decimal encoding number to chruch encoding number ? (define (encode n) (lambda(fn)(lambda(x) (funPower (fn n)x)))) What's wrong with my code? Thank you.
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unfolding recursive expressions

I've been recently working with recursive expressions in Python. An example of such expression is given as: ['+', [['*', ['i0','i1']], ['*', ['i2','i3']]]] I'm attempting to transform expressions ...
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How to make a function call itself n times

Let's say I have a function called f that takes an integer argument called x and returns an integer. I also have an integer n that says how many times the function must call itself. So for example if ...
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Return something enclosed in parentheses in Scheme

I have the following piece of code for the successor and predecessor of Church numerals: Consider the following code: (define zero (lambda () '() )) ; Initialize Church numeral zero as nil (define (...
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m to the power of 0 in Church’s Numerals

A topic on undergraduate level computer science. I came upon a bothering problem about (0 m) in terms of exponentiation of church’s numerals in lambda calculus when reviewing the theory. As far as I ...
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Converting this FreeT (explicitly recursive data type) function to work on FT (church encoding)

I'm using the FreeT type from the free library to write this function which "runs" an underlying StateT: runStateFree :: (Functor f, Monad m) => s -> FreeT f (StateT s m) a ->...
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Converting from Church Encoding to Numerals

I am trying to convert Church Encoding to numerals. I have defined my own Lambda definition as follows: type Variable = String data Lambda = Lam Variable Lambda | App Lambda Lambda ...
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subtraction of church numerals in F#

I am beginner in functional programming and F#. As an exercise im trying to implement church numerals. First I coded numbers as: let ZERO = fun p x -> x let ONE = fun p x -> p x let TWO = fun p ...
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System F Church numerals in Agda

I would like to test some definitions in system F using Agda as my typechecker and evaluator. My first attempt to introduce Church natural numbers was by writing Num = forall {x} -> (x -> x) -...
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Given a church encoded numeral as closure result from a CEK-machine, how to get back the number?

I have implemented the CEK-machine. Given a closure result from this algorithm and the knowledge that this closure is a Church-encoded numeral, what is the best way to print out the numeral? Using ...
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Church encoding of dependent pair

One can easily Church-encode pairs like that: Definition prod (X Y:Set) : Set := forall (Z : Set), (X -> Y -> Z) -> Z. Definition pair (X Y:Set)(x:X)(y:Y) : prod X Y := fun Z xy => xy x ...
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Church numerals and universe inconsistency

In the following code, the statement add'_commut is accepted by Coq but add_commut is rejected because of a universe inconsistency. Set Universe Polymorphism. Definition nat : Type := forall (X : ...
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Recursion for Church encoding of equality

For the Church encoding N of positive integers, one can define a recursion principle nat_rec : Definition N : Type := forall (X:Type), X->(X->X)->X. Definition nat_rec (z:N)(s:N->N)(n:N) ...
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Church encoding for dependent types: from Coq to Haskell

In Coq I can define a Church encoding for lists of length n: Definition listn (A : Type) : nat -> Type := fun m => forall (X : nat -> Type), X 0 -> (forall m, A -> X m -> X (S m)) -&...
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Printing Church Booleans

The following code is meant to print Church encoding of booleans as Haskell's Bool: {-#LANGUAGE FlexibleInstances #-} instance Show (t -> t -> t) where show b = show $ b True False Which ...
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Coq doesn't recognize equality of dependent list

I made a question before, but i think that question was bad formalized so... I am facing some problems with this specific definition to prove their properties: I have a definition of a list : ...
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Is there a way to give curried arrow functions a type/tag?

Function encoded types (i.e. nested curried functions) have some drawbacks in Javascript: Their representation in the dev console is obfuscated (e.g. [Some(5), None] is displayed as [f, f]) Nothing ...
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How to encode a Deferred type with Church?

With functions we can abstract from any type. Here is the Option type as an example: const Some = x => y => k => k(x); const None = y => k => y; const sqr = n => n * n; const ...
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TypeScript 3.0 error on `unknown` usage

Here, I test TypeScript3.0 unkown type. https://blogs.msdn.microsoft.com/typescript/2018/07/12/announcing-typescript-3-0-rc/#the-unknown-type TypeScript 3.0 introduces a new type called unknown ...
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Church encoding of lists using right folds and difference lists

Here is the sequential question after How to store data of a functional chain of Monoidal List? and Extracting data from a function chain without arrays and here I would like to express my respect and ...
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About Church encoded lists in Haskell

Various optimisation problems, like this one, led to Church encoded lists as a way to enable stream fusion, i.e the compiler's elimination of intermediate results (e.g. lists). Here's the definition ...
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reduction steps for successor of 1 with Church numerals

I am trying to understand which are the right steps to perform the following reduction following the normal order reduction. I cannot understand which is the correct order in which I should perform ...
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Church Numerals in F#

I have been trying to implement church numerals in F#. They were briefly introduced in a course at college and I may have gone down the rabbit hole a bit since then. I have working Predecessor, ...
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Church encoding conversion function fails to compile with GADTs

The to_c function below is rejected due to a type error when compiling with the GADTs extension that I want to use for an unrelated code fragment that is not shown here. newtype Church = Church { ...
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Church naturals, exponentiation function and type checking

I have a definition of the natural numbers in lambda calculus as follow, which was my main goal. -- Apply a function n times on x apply = \f -> \n -> \x -> foldr ($) x $ replicate n f -- ...
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Exponentiation function Haskell

How to get the exponentiation function in church numerals using Haskell? I'm trying to apply the rule, which is λxy.yx but something doesn't work right. exponentiation :: (Num a) => Func a ...
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lambda calculus xor expression by true false

I am trying to understand xor in context on lambda calculus. I understand xor (Exclusive or) as boolean logic operation in https://en.wikipedia.org/wiki/Exclusive_or and the truth table of xor. But ...
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How to define positive and negative integers and rational numbers in lambda calculus

I'm studying lambda calculus and only have basic knowledge about it. I read many of website and paper and understand the way that logic (T/F/and/or), predicate and successor work but I don't know how ...
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Type signature declaration of some operations with Church numerals

I was trying to implement Church numerals in Haskell. This is my code: -- Church numerals in Haskell. type Numeral a = (a -> a) -> (a -> a) churchSucc :: Numeral a -> Numeral a ...
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Can I implement an heterogeneous list based on an existential with Church encoding and Rank-N types?

In my attempt to understand existential types I've read that Church encoding along with the Rank-N-types extension would be sufficient to encode them in Haskell without existential quantification. I ...
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Define the notion of "pairs" using higher-order logic

Revising for a course on automated reasoning and I don't quite understand how to answer this question: Show how the notion of pairs (x, y) can be defined in higher-order logic using a lambda ...
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Are Church encoded sum types a proper alternative in an untyped language?

I have been struggling for quite some time with the idea of sum types in Javascript. The language includes neither native sum types nor pattern matching. While you can mimic sum types with plain old ...
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Does OCaml's type system prevent it from modeling Church numerals?

As a pass-time, I'm trying to implement all kinds of problems that were presented in a course (concerned with Lambda Calculus and various programming concepts) I took at the university. So, I'm trying ...
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Formulas that work with Church numerals

The wikipedia entry on lambda calculus defines some formulas that work with Church numerals like SUCC := λn.λf.λx.f (n f x) In Churches paper where he first defines his lambda calculus, he says ...
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Non-escaping error when implementing Church Numerals in Swift 3

I am attempting to implement Church Numerals in Swift 3. Currently, I have: func numToChurch(n: Int) -> ((Int) -> Int) -> Int { return { (f: (Int) -> Int) -> (Int) -> Int in ...
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How to create a type instance of class in haskell?

I'm a newbie in Haskell. I'm looking if there's any way to create an instance of type of a class. Is there any way to get this code working without using data or newtype? type N = ∀n. (n -> n) -...
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Typed/Racket: given Natural number defined type need multiply two numbers function to created

Given the following defined structures and type need to write multiply two numbers function. Having trouble to do that. Any advice will be greatly appreciated. (define-struct Zero ()) (define-...
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Is it possible to create a type-level representation of generic ADTs?

Using Church encoding, it is possible to represent any arbitrary algebraic datatype without using the built-in ADT system. For example, Nat can be represented (example in Idris) as: -- Original type ...
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Church encoding of boolean and STLC

It is often said that tru t f = t fls t f = f represent True and False in the sense that "we can use those terms to perform the operation on testing the truth of a boolean value". But that hides ...
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Find the most general types of the following lambda calculus terms

I am having trouble understand why these are the most general types for their respective Church numerals: 2 = λf.λx. f (f x) : (α → α) → α → α 1 = λf.λx. f x : (α → β) → α → β 0 = λf.λx. x : β → ...
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How to implement Church encoding division in haskell?

I'm a beginner in haskell, and trying to implement the Church encoding for natural numbers, as explained in this guide. I'd like to implement a division between two church numerals. {-# LANGUAGE ...
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lambda calculus in scala

OK, so I'm trying to implement the basics of lambda calculus. Here it goes. My numbers: def zero[Z](s: Z => Z)(z: Z): Z = z def one[Z](s: Z => Z)(z: Z): Z = s(z) def two[Z](s: Z => Z)(z: Z):...
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What is the purpose of Church Encoding?

Lately I was reading articles about Lambda calculus and Church Encoding, and although I formed a remote understanding of what they entail, I am having trouble finding purpose for using higher-order ...