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

learn more… | top users | synonyms

0
votes
0answers
11 views

Can Y Combinator be substituted or simulated?

Y Combinator - the Accelerator turned seed fund choose its name based on: 'The Y Combinator is a program that runs programs; we're a company that helps start companies.' What would you call a ...
0
votes
0answers
10 views

Try to understand what is variable, application and lambda abstractions in Lambda Calculus [on hold]

I'm new to Lambda Calculus and try to understand some basic definition of Lambda Calculus. I try to understand what is variable, application, lambda abstractions each term. I would like someone gives ...
1
vote
1answer
26 views

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 ...
0
votes
0answers
27 views

Can nor be expressed using SKI combinators?

I have question about SKI-Combinators. Can XOR (exclusive or) be expressed using S and K combinators only? True= Cancel False= (Swap Cancel) where Cancel: K x y = x Swap: S ff x y = ff y x ...
0
votes
1answer
33 views

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 → ...
0
votes
2answers
68 views

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 ...
3
votes
1answer
83 views

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 ...
4
votes
2answers
55 views

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) ...
1
vote
1answer
27 views

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 ...
2
votes
1answer
68 views

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 ...
3
votes
1answer
68 views

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 ...
6
votes
1answer
252 views

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 ...
2
votes
2answers
98 views

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: ...
0
votes
1answer
33 views

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 ...
0
votes
2answers
58 views

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), ...
0
votes
1answer
25 views

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 ...
2
votes
1answer
62 views

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 ...
1
vote
0answers
82 views

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 ...
1
vote
1answer
55 views

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 ...
-2
votes
1answer
30 views

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) ...
1
vote
2answers
70 views

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 ...
2
votes
0answers
77 views

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 ...
0
votes
1answer
21 views

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 ...
0
votes
1answer
35 views

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 ...
4
votes
1answer
58 views

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 ...
1
vote
1answer
56 views

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. ...
2
votes
1answer
90 views

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 ...
0
votes
0answers
22 views

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?
1
vote
1answer
54 views

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 ...
59
votes
2answers
3k views

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 ...
2
votes
2answers
235 views

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 ...
2
votes
1answer
90 views

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 ...
8
votes
0answers
120 views

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 ...
0
votes
1answer
64 views

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 ...
2
votes
1answer
28 views

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. ...
-1
votes
1answer
51 views

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 ...
0
votes
3answers
48 views

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 ...
0
votes
0answers
50 views

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 ...
2
votes
1answer
88 views

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 ...
6
votes
1answer
111 views

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 ...
2
votes
1answer
201 views

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) ...
1
vote
0answers
31 views

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, ...
2
votes
1answer
160 views

Scheme: Beta-Reduction Challenge

My teacher has given the class some sample exam questions (the class is basically on Scheme (Racket) and the lambda calculus), and I've hit a wall with the following problem: Define (β-reduce e) ...
-1
votes
1answer
55 views

Lambda notation in NLP

I should do semantics analysis and use lambda notation for following sentences I need help for : What is lambda notation for definite and indefinite determiner? Anna drew a red panda. for "a" I used ...
1
vote
0answers
25 views

Anyone know of any real systems using Computational Semantics with Lambda Calculus?

I was wondering if Computational Semantics is actually used in any real-world system? (Simple examples here and here). I would like to see how an actual system works. It seems like there are a ...
3
votes
2answers
111 views

Implement in Haskell the Church encoding of the pair for polymorphic λ-calculus/System F

I want to implement the Church encoding of the pair in polymorphic lambda calculus in Haskell. On page 77, section 8.3.3 of Peter Selinger's notes on lambda calculus, he gives a construction of the ...
3
votes
4answers
155 views

Is it possible to define Omega combinator (λx.xx) in modern Haskell?

Stack! Is it possible to define Omega combinator (λx.xx) in modern Haskell? I suppose, Haskell98's type system is designed to make things like this impossible, but what about modern extensions?
1
vote
1answer
74 views

Y-Combinator factorial in javascript works for numbers not for the Church numerals.

I managed to implement Church encoding and Y-Combinator using ES6 arrow function in javascript. But when I tried to evaluate the factorial function, FALSE = a => b => b TRUE = a => b => ...
1
vote
1answer
111 views

EVAL: undefined function NIL in Lisp

I'm trying to write a function named calculate that gets a list as an input, and calculates its value (works as a lambda calculus reducer). Here's my code: (defun substitue(x y z) (cond ((atom z) ...
8
votes
3answers
557 views

Is there any efficient way to convert an unary number to a binary number?

Let those datatypes represent unary and binary natural numbers, respectively: data UNat = Succ UNat | Zero data BNat = One BNat | Zero BNat | End u0 = Zero u1 = Succ Zero u2 = Succ (Succ Zero) u3 = ...