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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Lambda Calculus Reduction (applicative vs normal order)

I am a little confused to reduce these lambda calculus expressions. I am instructed to give applicative and normal order reductions for these expressions. (a) (λx. ((λy.(* 2 y)) (+ x y)))y (b) (λx. ...
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Haskell utility to make function point free [on hold]

I'd like to quickly and correctly reduce functions to point free form in Haskell. I'd prefer to produce fairly readable outcomes. How should I go about this?
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How to correctly curry a function in JavaScript?

I wrote a simple curry function in JavaScript which works correctly for most cases: var add = curry(function (a, b, c) { return a + b + c; }); var add2 = add(2); var add5 = add2(3); ...
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Parsing and implementing a lambda calculus in Rascal

I am trying to implement a lambda calculus inside of Rascal but am having trouble getting the precedence and parsing to work the way I would like it to. Currently I have a grammar that looks something ...
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Lambda Calculus and Y-Combinator with CoffeeScript

I am trying to implement a factorial function with lambda calculus in CoffeeScript: Basicly I created a fiddle for the issue: http://jsfiddle.net/turhn/fy548rj0/1/ Actually the yCombinator works ...
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How to compile Haskell into the untyped lambda calculus (or GHC core)?

I'm looking for ways how to convert a simple Haskell program (no imported libraries, just data types and pure functions) into a term of the untyped lambda calculus. A promising approach seems to be to ...
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Generating Church Encoded Numbers for Arbitrary Integers in Javascript [closed]

I want a function that takes an integer and returns that number in the form of a church encoded function. I have achieved this in newlisp: (define (reduce stencil sq) (apply stencil sq 2)) (define ...
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46 views

Turing Machines and Lambda Calculus equivalence

I am wondering can anyone explain to me in general terms, some proofs of the equivalence of Lambda calculus and turing machines and the general method of the proof. In as plain terms as possible.
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Lambda calculus entire expression substitution

About substitution of free occurances: can we have a substitution of an entire expression(function, application), or just of a variable: Example: Current expression \x.\y.(y, z) Expression to be ...
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Lambda-Calculus Representation in NLTK CCG

I am trying to implement a probabilistic ccg with lambda-calculus features. Basically i want to do the following code: >> lex = parseLexicon(r''' :- S,NP He => NP {sem=\x.he(x)} [1.0] ...
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85 views

Integer arithmetic counting using Lambda calculus

If anyone have idea that how to show an encoding of integer arithmetic counting using Lambda calculus?
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38 views

trying to understand church encoding in Scheme

I'm trying to understand the whole principal of church encoding through Scheme. I think I understand the basics of it such as Church numeral for 0 (define c-0 (lambda (f) (lambda (x) x))) Church ...
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Is that possible to implement a stack with lambda expressions only?

This might not be a very practical problem, I'm just curious if I can implement a stack with only lambda expressions. A stack supports 3 operations: top, pop and push, So I begin with defining the ...
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Why closure use seems so “chicken or egg”

I've read and somewhat understand Use of lambda for cons/car/cdr definition in SICP. My problem is understanding the why behind it. My first problem was staring and staring at (define (cons x y) ...
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Why does the y-combinator provide Turing equivalence?

This answer says Here is a basic y-combinator in lambda calculus: Y f = (\x -> f (x x)) (\x -> f (x x)) Ie Something like this in Clojure: (defn Y [f] ((fn [x] (x x)) (fn [x] (f ...
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Assigned Anonymous Functions vs Named Function Declarations

In developing a functional programming language, is it possible to make assigned anonymous function expressions equivalent to named function declarations/definitions? For example in this pseudo ...
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145 views

Haskell - How to write twice function using (.) f g - function composition

Here is the problem, i need to write the well known twice function (twice= \x-> \x-> x) but this time using (.) composition function like (.) f g. I don't know how to solve it, cause I ...
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1answer
87 views

Function closure versus continuation, in general and SML

I'm starting to doubt I really understand this topic. Until now, I was understanding a continuation as calling a function with closure (typically returned by another function). But MLton seems to ...
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1answer
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Is my alternate definition of scc in the lambda calculus correct?

scc is a combinator (successor) that takes a Church Numeral n and returns another Church numeral. We have in mind that church numerals are defined as follows: c_0 = λs. λz. z; c_1 = λs. λz. s z; c_2 ...
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Checking understanding of: “Variable” v.s. “Value”, and “function” vs “abstraction”

(This question is a follow-up of this one while studying Haskell.) I used to find the notion between "variable" and "value" confusing. Therefore I read about the wiki-page of lambda calculus as well ...
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28 views

In lambda calculus, can variable be expression in general?

For better understanding of functional programming, I am reading the wiki page for lambda calculus here. The definition says: If x is a variable and M ∈ Λ, then (λx.M) ∈ Λ Intuitively I ...
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32 views

Add4 Using Lambda Expression

I know that using lambda expressions, we can write succ = λnfx • f (n f x ) and twice = λfn • f f(n ). My aim now is to write add4 using these two which adds 4 to the church numerals. How do I write ...
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Lazy evaluation and nested thunks eating up memory

I'm working on a tiny lambda calculus engine which I want it to be lazy as Haskell. I'm trying to, at least for now, stick to Haskell's rules so that I don't have to rethink everything, but I don't ...
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439 views

How did Haskell add Turing-completeness to System F?

I've been reading up on various type systems and lambda calculi, and i see that all of the typed lambda calculi in the lambda cube are strongly normalizing rather than Turing equivalent. This includes ...
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Functional “simultanity”?

At this link, functional programming is spoken of. Specifically, the author says this: Simultaneity means that we assume a statement in lambda calculus is evaluated all at once. The trivial function: ...
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Non recursive lambda evaluator that “magically” optimizes tail recursion

I think pasting my main method GetTermValue plus the StackFrame class and a couple of helper methods (Return and Replace) should be all I need to keep it concise, but first a few notes about the code: ...
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1answer
40 views

General recursion to tail-recursion

Is it theoretically possible to transform every kind of general-recursion into tail-recursion? Are they equivalent for example from a lambda-calculus point of view? That's a debate between me and an ...
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222 views

Pure Lambda Calculus - and function

I am currently learning Haskell and also participating in a rather theoretical lecture about functional programming at university. I know that this is purely theoretical/academic question, but ...
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325 views

Why is a built-in function applied to too few arguments considered to be in weak head normal form?

The Haskell definition says: An expression is in weak head normal form (WHNF), if it is either: a constructor (eventually applied to arguments) like True, Just (square 42) or (:) 1 a ...
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lambda calculus of (Lx.xfx)(Lf.xf)(Lx.xf)

i'd like to ask why this lambda expression: (Lx.xfx)(Lf.xf)(Lx.xf) is redused in normal form in this way: -> (Lf.xf)f(Lf.xf)(Lx.xf) -> (xf)(Lf.xf)(Lx.xf) Why do I stop here? why do I not ...
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How lambda calculus works with an expression like: (Ly.Lt.yt)zx?

I do not understand how to solve this lambda calculus expression: (Lx.yx)((Ly.Lt.yt)zx) I do not understand how zx is passed and evalueted. Is it passed to Ly or Lt ? Can you help me? EDIT: This ...
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63 views

is Milner'c CCS turing complete

So one can say a language is Turing complete if it meets some criteria. Milner's Calculus of Communicating Systems (CCS) is Turing complete. However, I could not find a proof for this. Is there any ...
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Is it possible to implement addition on typed Church numerals using iterated incrementation?

I can't find a way to define addition as repeated incrementation, despite this being possible in an untyped language. Here is my code: {-# LANGUAGE RankNTypes #-} type Church = forall a . (a -> a) ...
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creating two related ASTs with sealed case classes in Scala

Whenever I've had to create an AST in Scala, I've used the abstract sealed trait/ case class pattern. It's worked really well so far, having compiler checked pattern matching is a big win. However ...
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Lambda Calculus Syntax

I've got my exams in a couple of weeks time and as part of my studying I consistently come across the question: Give the syntax for the simply typed lambda calculus i.e. terms, types and the rules ...
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How to implement let* using lambda

I am doing lambda calculus and in my textbook, it says how would your write let* using lambda calculus. My answers: x, y and z are the parameters; v1, v2 and v3 the arguments; e is the body: ...
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The difference between Lists as pairs and Lists as recursors in the Lambda Calculus

I understand that there are several ways to represent lists in the lambda calculus. Using pairs I can write a list as (t1, (t2, (t3, NIL))) which is equivalent to the lambda term \f. f t1 (\f. t2 ...
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Simple lambda calculus DSL using GADTs in OCaml

How do you define a simple lambda calculus-like DSL in OCaml using GADTs? Specifically, I can't figure out how to properly define the type checker to translate from an untyped AST to a typed AST nor ...
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Verify the type of a lambda expression

I need to verify the type for the lambda expression: My method gives me: Im trying to define it in Haskell (on Hugs) like this: h= \f x -> f (f x) When i call the :type comamnd it gives ...
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fixed point and head normal form

I have this question, given the lambda term s = [ Lambda xy.y(xy) ] , fixed points can be found by applying fixed point combinators such as y and theta, then get for example t = ys or t = theta(s), ...
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Pattern in point-free combinator, how related to SKI calculus

As an exercise, I converted the following combinator to point-free notation: h f g x y z = f x (g y z) with the usual convention of f, g, h as functions, and x, y, z as expressions. (This is not a ...
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Is the following a legit successor function for lambda calculus ? (Church Numeral)

I have read from the books that, the successor for Church Numerals is of the form: (\lambda n f x. f (n f x) ) Last night I came up with this: (\lambda a b c. (a b) (b c) ) I believe it also ...
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beta reduction: correct way to replace bound variables?

say I have the following example of a lambda expression with \x meant to represent lambda x What would the beta reduction of the following be? (\x.\x.(x x)) \z.z My first instinct would have been ...
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How would you abstract away the boilerplate in this pair of “similar shaped” datatypes

General Question I have a pair of datatypes that are two different ways of representing the same thing, one records the variable name in String, while the other one records the variable name in Int. ...
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How do you formulate n-ary product and sum types in this typed lambda calculus universe?

Here is the code where I'm having an issue: {-# LANGUAGE GADTs, LANGUAGE DataKinds #-} -- * Universe of Terms * -- type Id = String data Term a where Var :: Id -> Term a Lam :: Id ...
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Lambda Calculus (λa.b)((λx.xx)(λx.xx)) [closed]

Im looking for an example of a weakly normalising lambda term. Am I right in saying that the following: (λa.b)((λx.xx)(λx.xx)) Reduces to: b or: doesnt terminate (if you try to reduce ...
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What is an algorithm to enumerate lambda terms?

What is an algorithm that will enumerate expressions for the lambda calculus by order of length? For example, (λx.x), (λx.(x x)), (λx.(λy.x)) and so on?
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How to implement `EQ` of LISP in lambda calculus?

I'm learning lambda calculus these days and found it very beautiful and interesting, but I haven't found out how to implement the EQ primitive of LISP, which judges if two symbols are the same. I ...
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Is it possible to implement foldl/foldr using unsided fold?

By unsided fold, I mean a hypothetic primitive fold operation for associative operators that, does not guarantee any ordering. That is, (fold + 0 [a b c d]) could be (+ (+ a b) (+ c d)) or (+ (+ (+ a ...
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Why doesn't this lambda calculus reducer reduce succ 0 to 1?

data Term = Var Integer | Apply Term Term | Lambda Term deriving (Eq, Show) sub :: Term -> Integer -> Term -> Term sub e v r = case e of Var x -> if x == ...