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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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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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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223 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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Result of the operation (nfx.f(n f x) st.ssst)

It's Lambda calculus, but I don't have any idea, there are 4 answers: a) λst.ssst b) λst.sst c) λfx.ffffx d) λfx.fffx Any ideas?
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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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33 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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38 views

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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128 views

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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19 views

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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221 views

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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How does Binary Lambda Calculus produce output from input?

I'm trying to understand the operational details of the Binary Lambda Calculus (and perhaps lambda calculus in general) described here: http://www.ioccc.org/2012/tromp/hint.html I'm not sure exactly ...
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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 ...
3
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1answer
58 views

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 == ...
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for fixed point combinator Y, what is \x.f(xx)

For the Y combinator theorem, For every function F there exists an X such that FX=X what's the F mean here? what's the fixed point for F(x) = x +1? My understanding is that x+1=x does not have a ...
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How do you evaluate exponentiation of church numerals?

Exponentiation over church numerals is defined as: expt ≡ λmnsz.nmsz But I'm having some trouble evaluating it in cases where the power is not 0 or 1. Consider this example: expt C3 C2 ≡ ...
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Is lambda-calculus without self-application turing complete? [closed]

Is lambda-calculus without self-application turing complete? Is there a proof of so?
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264 views

Looking for a Church-encoding (lambda calculus) to define < , > , !=

I have to create some Lambda functions for > , < and != I don't have an idea how to , could anyone help me please ? PS: We just started with Lambda Calculus, so please do not assume any previous ...
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Find the lambda-terme without free variables of the following types?

Could someone please explain the process of finding the lambda-terme without free variables of the following types ? I have some idea on how I should solve this but I'm not really sure it's the right ...
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Haskell, lambda calculus for Evaluation

(Figure 1) A part of the simply typed lambda calculus (Figure 1), it is implemented in Haskell as given below. evaluate expression = do case expression of (Application (Lambda x ...
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Define the binary exponential operator CARAT.in lambda calculus CARAT

I am trying to define binary exponential operator in lambda calculus say operator CARAT. For example, this operator may take two arguments, the lambda encoding of number 2 and the lambda encoding of ...
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Haskell for Lambda Calculus, Type Inferencing

My adventure in Haskell programming hasn't been all epic. I am implementing Simple Lambda Calculus, and I am glad to have finished Syntax, Evaluation, as well as Substitution, hoping they are correct. ...
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Lambda calculus reduction of expression

I have the following expression and need help doing the reduction. The left hand expression has to equal to the right hand expression. (λn.(λs.(s (λx.λy.y))n) λx.x)(λx.λy.y) = λx.x (λn.(λs.(s ...
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How does C# evaluate lambda expressions? [closed]

I've been reading a bit about algorithms for evaluating lambda calculus (not parsing but just evaluating after is parsed), but so far all of them seem the kind of method you'd use with a pen and ...
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What do you call the derivative of a lambda expression?

In math, the derivative of some function f(x) would be written as f'(x) or df/dx. What would you call the derivative of a lambda expression or anonymous function? For instance, how would you write ...
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In lambda calculus, how would I write a function that returns true when its input is the identity function?

In lambda calculus, how would I write a function that returns true when its input is the identity function? Assume true is some church encoded value of true. It seems like this should be an easy ...
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1answer
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Antlr4 Grammar for Function Application

I'm trying to write a simple lambda calculus grammar (show below). The issue I am having is that function application seems to be treated as right associative instead of left associative e.g. "f 1 2" ...
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To do beta reduction in Matlab?

How can you do a beta reduction like the following in Matlab? My goal is to avoid duplicate assignments and lazy-evaluate things -- perhaps related to the question multiple step anonymous ...
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Knights of the Lambda Calculus infinity written as lisp code

Knights of the Lambda Calculus logo have infinity written as (Y F) = (F (Y F)) is this lisp code the same and is it represent infinity too? (Y (λ (F) (Y F)))
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Definition of substitution in Lambda expression

Let's denote [x |-> v] t as "substitute all free occurrences of x in t with v". The substitution rules of my textbook are [x |-> v] x=v [x |-> v] y=y (where y is not x) [x |-> v] ...
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Haskell - Lambda calculus equivalent syntax?

While writing some lambda functions in Haskell, I was originally writing the functions like: tru = \t f -> t fls = \t f -> f However, I soon noticed from the examples online that such ...
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3answers
175 views

Can this be expressed in point free style?

Given the following expression to sum an IEnumerable of numbers: let sum l = l |> Seq.reduce(+) //version a is it possible to eliminate the argument--like so? let sum = Seq.reduce(+) ...
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Encoding the dynamicaly-typed lambda calculus in Haskell using recursive types

I'm reading Pierce's Types and Programming Languages book and in the chapter about recursive types he mentions that they can be used to encode the dynamic lambda calculus in a typed language. As an ...
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Decidability of bi-cartesian closed categories

Is the decision problem for the free bi-cartesian closed category (BCCC) decidable? Equivalently, is equality decidable for the simply-typed lambda calculus extended with strong n-ary products and ...
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lambda calculus grammar LLR

I am trying to write a lambda calculus parser, the grammar I defined seems not in LLR: E ::= x | \x.E | EE | (E) I reduce the left recursive: E ::= xE' | \x.EE' | (E)E' E'::= EE' | <empty> ...
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1answer
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Reduction in Lambda Calculus

I have been recently studying about lambda calculation and i have many doubts about reduction and substitution . What is alpha and beta reduction are? And when and why are they used ?. It would be ...
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encoding binary numerals in lambda calculus

I have not seen any mention of binary numerals in lambda calculus. Church numerals are unary system. I had asked a question of how to do this in Haskell here: How to implement Binary numbers in ...
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Deciding inhabitation?

Consider the basic system of simple types usually known as TAλ. One can prove that (as a consequence of the so called Subject Reduction Property and the fact that any typable term is strongly ...