Questions tagged [lambda-calculus]

λ-calculus is a formal system for function definition, function application and recursion which forms the mathematical basis of functional programming.

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Strip `FALSE` prefix from Boolean list using the y-combinator? Stumped

Given a list, e.g. (f: f FALSE (g: g FALSE (h: h TRUE FALSE))), write an operator that removes all leading FALSEs and returns only the tail that starts with TRUE. For this example the operator should ...
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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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Haskell save recursive steps into a list

I'm working on Haskell lambda calculus interpreter. I have a method which reduces expression to it's normal form. type Var = String data Term = Variable Var | Lambda Var Term | Apply ...
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Haskell algorithm to find all possible Beta reductions

I'm trying to come up with an algorithm that would print all available beta reductions for a given expression. I know I will need a matching pattern cases to see if item is reducible and if not then ...
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Haskell Church Numerals with custom types

I'm trying to solve a Church numerals parser I have a custom type which distinguishes between variable, lambda and application type Var = String data Term = Variable Var | Lambda Var Term |...
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Haskell church numerals can't print | Expected a type, but T has kind `f`

I'm following a guide on Wikipedia on how to deal with church literals. As per article there is a Haskell snippet: Link to Wiki Here type Church a = (a -> a) -> a -> a church :: Integer ->...
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Reduce this lambda Expression

(λy.λy.yy)(yy) Guys, I am unable to solve this expression. I would appreciate it if someone helps me solve this lambda expression with stepwise reduction
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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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How does Scheme abstract data?

In statically typed language, people are able to use algebraic data type to abstract data and also generate constructors, or use class, trait and mixin to deal with data abstraction. In dynamically ...
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Lambda Calculus: Re-Ordering Variables

Given any multivariable expression in Lambda Calculus (LC), e.g. for an arbitrary LC expression "op" for some non-commutative operation: E = (\x (\y ( op x y ) ) ) Does there exist an LC ...
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Why does (( (λf.λx.f(f(f(x)))) (λg.λy.g(g(y))) ) (λz.z + 1)) (0) evaluate to 8?

So I have this lambda expression: (λf.λx.f(f(f(x)))) (λg.λy.g(g(y)))(λz.z + 1)(0) and I'm trying to evaluate it by hand. They way I'm thinking about this is that (λf.λx.f(f(f(x)))) basically ...
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Is it possible to write a data structure or data structures that represent only closed terms in Haskell or any other language?

Using the De Bruijn notation, it is possible to define lambda terms as: data BTerm = BVar Int | BLam BTerm | BApp BTerm BTerm Or using the usual notation, data Term = Var String | Lam String Term | ...
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Example assembly/machine instruction from lambda calculus

I'm learning a bit of lambda calculus and one of the things that I'm quite curious about is how the totally-abstract functions might actually be applied in instructions. Let's take the following ...
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From a pair to a list in lambda calculus / scheme

I'm learning a bit about lambda calculus (which is very neat) and have defined the following in scheme for how a pair would be done: ; PAIR ; λabf.fab (define PAIR (lambda (a) (lambda (b) (lambda (f) (...
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Lambda calculus to scheme

Is the following the correct way to "map" how a lambda function looks to how it would be written in scheme? (λx.x+1) 5 ↦ (lambda (x) (+ x 1) 5) Additionally, how are lambda functions 'named' ...
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Re-writing church numerals function

In SICP it defines the church numerals for positive numbers as follows: (define zero (lambda (f) (lambda (x) x))) (define (add-1 n) (lambda (f) (lambda (x) (f (n f) x)))) The following is my '...
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Is is allowed to move the argument to the right or left of the Lambda Term?

When can we move the argument to the right of the lambda term? To the right of the bracket. In what scenarios it is allowed?
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Why is it not possible to implement fixed-point combinator like in the definition?

I'm trying to implement the Y-combinator like in the definition by Curry. This code does not work. It causes infinite recursion. F = (lambda f: (lambda x: (1 if x == 0 else (x * (f(x-1)))))) Y = ( ...
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Integration using Lambda function gives an error

I am trying to integrate an exponential function using a Lambda function first time. There are two versions of codes that should work the same, but the one with Lambda function is giving an error ...
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Recursion in a lambda expression

Is it possible to write a recursive lambda expression in Isabelle/HOL? If so, how? For example (a silly one): fun thing :: "nat ⇒ nat" where "thing x = (λx. if x=0 then x else …) x&...
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How to test lambda-calculus?

I implemented the lambda-calculus in C++, but now I don't know how to get out of it. I would like to test if my functions return the right thing, but I cant compare the result, since it is a funtion. ...
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Y combinator in scheme blows up using Church numbers, but works on regular numbers

I've just read "A Tutorial Introduction to the Lambda Calculus1" by Raul Rojas. I put the lambda expressions into Scheme (TinyScheme) to try them out. Everything worked except the recursive ...
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How do you write the typing reference for this using rules from simply typed lambda calculus?

I have to give the typing derivation for this particular statement • ` λf : unit → (unit × unit).fst (f ()) : (unit → (unit × unit)) → unit. I am super new to this and don't understand why it will ...
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What is the difference between normal and lambda Haskell functions?

I'm a beginner to Haskell and I've been following the e-book Get Programming with Haskell I'm learning about closures with Lambda functions but I fail to see the difference in the following code: ...
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Loop while proving a theorem

I am trying to prove the following theorem after formalizing lambda calculus with Debruijn indices and substitution in Coq. Theorem atom_equality : forall e : expression , forall x : nat, (...
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Coq proof stuck in a loop

Edit : It was a newbie mistake. I missed out on the case beta_equivalence (Var x) (Application (Abstraction 0) Var x). Please refer to this question instead : Loop while proving a theorem Thanks! I am ...
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I need some help on the steps to do eager evaluation on a Lambda calculus expression?

I'm confused on how to trace the eager evaluation steps of the this Lambda Calculus expression. I'm not sure what the steps are. (λu.(u λg.λh.h) ((λx.λy.λf.((f x) y) a) b))
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Capture-avoiding substitution function — Lambda calculus

So I got below substitute function with which I'm trying to replace b for Church numeral 0 in example term: \a. \x. (\y. a) x b *Main> substitute "b" (numeral 0) example which is ...
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Order of parentheses in lambda calculus if paranthesis are already given?

I know that application is left associative and abstraction is right associative. Also functions are given preference but I came across some questions which already had "some" parenthesis ...
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How does pair/vireo accessing work in Lambda Calculus?

(DISCLAIMER SYNTAX: i am using λabc.exp instead of λa.λb.λc.exp) TLDR/EASIER EXAMPLE: V:= λgxf.f(ga) GETG:= λa.a(g) GETG V(N1 N2) I wanna know if this is valid, ie. GETG === N1 FULL (what I'm ...
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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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Is ((f f) (g g)) reduced differently in AOR and NOR?

How is ((f f) (g g)) reduced in both applicative order reduction and normal order reduction? do both reduce the statement in the same way?
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Debug: Couldn't match expected type ‘GHC.Types.Bool’ with actual type ‘Bool’

I'm trying to resolve the following exercise of Haskell: Define the function exists::(N-> Bool)-> N->Bool, which receives a predicate p and a natural n, and returns True if there is any ...
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How does Haskell perform Beta conversion to derive a type?

I'm learning Haskell by taking fp-course exercise. There is a question block my way. I don't know how Haskell infer lift2 (<$>) (,)'s type, and turn out Functor k => (a1 -> k a2) -> a1 -...
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Lambda Calculus Evaluate: First Reduce expression and then substitute?

I am starting learning haskell and today in my class our teacher has resolved an excercise which we have to subtitute the expressions given. One of those expressions which was resolved by the teacher ...
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Lambda Calculus let explanation needed

In this treatment of let a lambda calculus version of let is given (\f.z)(\x.y) with the words f is defined by f x = y in the expression z, and then as let f x = y in z I know from a beginner's ...
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Does SKS equal SKK?

Context I started teaching myself lambda calculus last night and I am trying to determine if what I understand so far is correct. Understanding SKK is equivalent to the Identity combinator, I. Where L ...
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How to turn Integer-List Generator [m …] in Lambda Calculus in Haskell

I have given a task to make the Integer-List Generator [m...] in lambda calculus. So it should fullfill this definition. Y F m ≡ : m (Y F (+ m 1)) Therefor a lambda calculus F is needed. I don't know ...
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Haskell dependent, independent variables in lambda function as applied to foldr

Given > foldr (+) 5 [1,2,3,4] 15 this second version foldr (\x n -> x + n) 5 [1,2,3,4] also returns 15. The first thing I don't understand about the second version is how foldr knows which ...
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Parsing a series of lambda calculus terms

I am writing a lambda calculus parser in Haskell and I can't find a solution to fix its current problem. How I parse expressions: expr :: Parser LamExpr expr = do terms <- some $ token term ...
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S-K basis Completeness in combinatory logic

I was reading the following Wikipedia page on combinatory logic and am puzzled by the example that is given: https://en.wikipedia.org/wiki/Combinatory_logic#Completeness_of_the_S-K_basis Using the ...
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Show that term `cons` works by showing all beta reductions

I'm new to functional programming. So the terms cons appends an element to the front of the list. Where cons ≜ λx:λl:λc:λn: c x (l c n) How should I go about proving that cons works correctly using ...
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Pure Prolog δλ-Calculus Equality

It is not so difficult to conceive an appartness relation for Peano numbers. Its even possible to make a reified eq/3 predicate like here. Question is now, whether we can push the boundary and also ...
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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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What does postcompose mean when talking about lambda calculus?

When reading various papers about the lambda calculus, ISWIM and a number of other things, I have heard the word "postcompose" come up a lot (e.g. in https://en.m.wikipedia.org/wiki/...
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What is the J operator and is it the same as call/cc?

I have heard of the "J operator" or "program point operator", when researching about ISWIM. I would like to know what it is. The Wikipedia article for it is very vague: In ...
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Practical usage of lambda calculus

I have recently started self learning lambda calculus. One thing i am unable to visualize is how this language can be used to build practical applications. One simple use case i could think of is the ...
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Declaring an OCaml user-defined type as a function

I am writing a Lisp interpreter in OCaml. This describes my type system: type atom = Bool of bool | Int of int | Float of float | String of string | ...
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How to apply just one beta-reduction to λy.(λx.λy.yx)yz?

I am not understanding how to reach the correct answer, which is λy.(λw.wy)z Renaming is allowed only if necessary, and from the answer it is obvious renaming was used.
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What is the difference of λx. x (λy. y) and (λx. x) (λy. y)

Lambda expressions extend as far to the right as possible. For example λx. x λy. y is the same as λx. x (λy. y), and is not the same as (λx. x) (λy. y). I cant see the difference, in both cases it ...

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