Tagged Questions

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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How to encode the identity function in ANF?

I am trying to grok ANF (administrative normal form) but I'm having trouble understanding the translation from lambda terms. Consider this lambda term: λx.x. How do you encode it in ANF? x is a ...
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What does Core Haskell applying types to functions mean?

I wrote a custom pretty printer for Core Haskell in order to better study Core's structure. The gist of this pretty printer is that it takes a CoreModule and includes data constructors in the output, ...
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Call by name vs normal order

I know this topic has been discussed several times, but there is something still unclear to me. I've read this question applicative-order/call-by-value and normal-order/call-by-name differences and ...
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What is the canonical implementation of System F?

System F is a great way to simply reason about types when programming a prototype. Other than implementing it myself, I'd like to use an existing implementation. When looking for implementations, ...
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Representing a fixpoint in a head-normal lambda calculus AST

Consider the following normalized term representation, obtained during type checking: data Normal a = Neutral (Neutral a) | Type | Pi (Normal a) (Normal (Maybe a)) | Abstract (Normal (Maybe a)...
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What is required to extend an Untyped Lambda calculus implementation to cover the Simply Typed Lambda Calculus?

Matt Might talks about implementing a Lambda Calculus interpreter in 7 lines of Scheme: ; eval takes an expression and an environment to a value (define (eval e env) (cond ((symbol? e) (cadr (...
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Reduce lambda-expressions in WHNF

I have to reduce the following lambda-expression into WHNF, but I am not quite sure how to do it: (λx y. x 3) (+ 4) (+ 6 7) So, how do I do it? Call-By-Name Reduction? Is this expression(other ...
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Y Combinator implementation Scheme

I am really new to scheme functional programming. I recently came across Y-combinator function in lambda calculus, something like this Y ≡ (λy.(λx.y(xx))(λx.y(xx))). I wanted to implement it in scheme,...
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Type of anonymous identity function in Idris

When checking the type if id in Idris, we get what we would expect: > :type id id : a -> a However, checking the lambda expression version throws a difficult error: > :type \x => x (...
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Can XOR be expressed using SKI combinators?

I have question about SKI-Combinators. Can XOR (exclusive or) be expressed using S and K combinators only? I have True = Cancel False = (Swap Cancel) where Cancel x y = K x y = x Swap: ff ...
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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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Polymorphic lambda calculus

In the very instructive talk Constraints Liberate, Rúnar says, there is exactly one way to implement a function with this signature: def id[A](a: A): A Well, obviously. But nitpicking people could ...
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How to represent sugared λ-terms in Haskell?

Set up data definitions for the sugared λ-calculus, with this grammar. Λ → v Λ → ( λ v Λ ) Λ → ( Λ Λ ) Λ → (L Λ) L → (LET (LL) Λ) LL → (v Λ) Here is what they wanted me to do. So I did this for ...
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Why do java lambda expressions not introduce a new level of scope?

As I understand, in languages such as Haskell, and also as part of the lambda calculus, each lambda expression has its own scope, so if I have nested lambda expressions such as: \x -> (\x -> x) ...
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Lambda Calculus: build a function that takes more arguments with each iteration

I'm trying to build a function that takes a given number of arguments and always return the same value. This is a part of an homework. There is a hint provided: The "k-way T" is a function that ...
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What are the semantics of adding the parameter in LHS of function definition in haskell?

I'M a beginner in haskell and trying to understand the Let vs Where wiki page. At the end there's an example where adding the parameter x in the left hand side of function definition fib changes the ...
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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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Using the y combinator in haskell

I'm a beginner in haskell, and trying to implement the Church encoding for natural numbers, as explained in this guide. I used a definition of y combinator from this answer, but not sure how to apply ...
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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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Well typed and ill typed lambda terms

I have been trying to understand the applied lambda calculus. Up till now, I have understood how type inference works. But I am not able to follow what is the meaning of saying that a term is well-...
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Recursive lambda calculus function

I would like to create a lambda calculus function P such that (P x y z) gives ((x y)(x P)(P z)). I have tried using variants of the Y-combinator/Turing combinator, i.e. functions of the form λg.(g g), ...
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Lambda Calculus Reduction / evaluating expressions

I was reading these notes on lambda calculus, and I am having some trouble reducing / evaluating one of the expressions at the start. In particular the function (λf.λx.f(f(x)))(λy.y^2)(5). How ...
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How to model the output of the binary lambda calculus?

I am trying to write an interpreter for John Tromp's binary lambda calculus I have written code to do the following: Parse the binary input into some data structure representing the regular untyped ...
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Generating fresh names for nameless lambda terms

Is there some common technique or library for generating fresh names when converting nameless lambda terms to named ones? This is what I came up with (the minimal example is based on the ...
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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 ...
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Values of lambda expressions and associativity

Can someone tell me what are the results of these lambda expressions when substitute x=5? a) λx. ((λx.x+1) x) b) (λx. (λx.x+1)) x Here is what I think. a) λx. (λx.x+1) x)5 = (λx.x+1) 5 = 6 b) (...
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What exactly are GHC type coercions?

I have been looking up haskell's core language to understand how it works. One feature that I found during my internet searches were type coercions. I know that they are used to implement GADTs, but I ...
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Lambda calculus (SML) - Apply a church number to another

I'm trying to understand the exponentiation function on Church numerals: fun power m n f = n m f; In it, I see a multiplication. I know that it's wrong, because the multiplication is: fun times m ...
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Difference between beta reduction and single step beta reduction?

I went through numerous online sources on lambda calculus searching for the difference between beta reduction and single step beta reduction. But all that I know till now is that beta reduction is ...
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Difference between “free variable” and “free occurrence of a variable” in context of lambda calculus

Is there any difference between free variable and free occurrence of a variable in context of lambda calculus? If yes, then please explain with an example or two. Actually I was going through the ...
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Does Unbound always need to be in a `FreshM` monad?

I'm working on a project based on some existing code that uses the unbound library. The code uses unsafeUnbind a bunch, which is causing me problems. I've tried using freshen, but I get the ...
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Is There an LL(k) Grammar for PCF?

We're working on top-down parsing in a compiler design class. Examples are all java-like languages. I decided to try a simple functional language to make it interesting so I went with PCF (see e.g. ...
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Thue-Morse Sequence in one Line of Haskell

I wrote a definition for the Thue-Morse squence as an infinite list of integers in one line of Haskell: thueMorse = 0:1:f (tail thueMorse) where f = (\(x:xs) -> x:(1 - x):f xs) This is the ...
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lambda calculus, normal order, normal form,

In lambda calculus, if a term has normal form, normal order reduction strategy will always produce it. I just wonder how to prove the above proposition strictly?
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can't deduce the numeral representation (church encoding) of a lambda expression λx.λy.x(xy)

I have a lambda expression: λx.λy.x(xy), and I'm supposed to infer the integer representation of it. I've read a lot about Church encodings and Church numerals specifically but I can't find what ...
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Why is Haskell (GHC) so darn fast?

Haskell (with the GHC compiler) is a lot faster than you'd expect. Used correctly, it can get close-ish to low-level languages. (A favorite thing for Haskellers to do is to try and get within 5% of C (...
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How can perform a y→λx.yx 'lifting' of a function into a functor?

Edit: A one-liner summary: Is it possible to create a templated type whose operator() calls an arbitrary function, specified as a template parameter? Consider the (templated) function template <...
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Relational operations using only increment, loop, assign, zero

This is a follow up question for: Subtraction operation using only increment, loop, assign, zero We're only allowed to use the following operations: incr(x) - Once this function is called it will ...
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floating pass of fully lazy lambda lifting?

I'm reading implementing functional languages: a tutorial, and encountered a problem when implementing floating pass of fully lazy lambda lifting. I would like to describe how floating works to make ...
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Haskell: Evaluating lambda expressions manually - determine general types

First of all, sorry if I'm not not posting this on the correct site since I'm not sure if it's more of a mathematical question than a programming one, but since I'm using this with Haskell and ...
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An example of where normal order has less steps than applicative order?

I can't seem to come up with an example of this and wondering if there is such a case? I know if I have an expression where applicative order doesn't terminate that normal order may still terminate. ...
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Lambda Calculus - Inserting Parentheses?

This is a question from my midterm that I do not understand how to do. Insert parentheses in to clarify how it's parsed x y λx.x y The answer is : ((x y) (λx.(x y)))) Could someone explain how you ...
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Optimizing query that uses AsEnumerable and SingleOrDefault

Not long ago there was a feature request in the program I am maintaining. Basically it has to fill up a table in the database with info from a text file. These files can be pretty big, but it was ...
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Is it possible to efficiently implement Lamping's abstract algorithm on interaction combinators?

There is a known implementation of λ-calculus terms on interaction nets. It is, though, overly complex and inefficient. It is known that Lamping's abstract algorithm is capable of evaluating a very ...
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Lambda Calculus Reduction steps

I am studying Lambda Calculus and I am stuck at Reduction.... Can anyone explain the types of reduction with this example, especially beta reduction in the simplest way possible. Also wouldn't mind an ...
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Is it actually possible to remove “Pi” from Calculus of Constructions?

The article Simpler, Easier! claims it could be possible to encode dependent type systems even without the presence of "Pi" - that is, you could reuse the "Lam" constructor for it. But how can that be ...
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Subtraction operation using only increment, loop, assign, zero

I am trying to build up subtraction, addition, division, multiplication and other operations using only following ones: incr(x) - Once this function is called it will assign x + 1 to x assign(x, y) -...
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Using Beta reductions to compute lambda terms

I need help understanding lambda calculus and beta reductions. I was assigned this: And I have no idea where to even begin (not sure on how to even read it correctly). I have looked at lectures, ...