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

1
vote
1answer
52 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 ...
-1
votes
0answers
11 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
43 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 ...
52
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
206 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
56 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
106 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
59 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
25 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
34 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
44 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
32 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 ...
1
vote
1answer
37 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
108 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
130 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
27 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
142 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
35 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
17 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
102 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
127 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
53 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
84 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
271 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 = ...
8
votes
1answer
142 views

Is it possible to infer the normalized source of a pure λ function on Haskell?

Let a pure λ function be a term with nothing but abstractions and applications. On JavaScript, it is possible to infer the source code of a pure function by applying all abstractions to variadic ...
-1
votes
1answer
48 views

Y-Combinator definiton

I am trying to understand the fixed-point combinator. I think it is used by some languages to implement recursion. The main problem is that I couldn't get the next definition: So please explain the ...
4
votes
1answer
212 views

How can you recover the source code from a pure JavaScript function?

By Pure, I mean in the sense of the λ-calculus, i.e., a single-argument function containing nothing on its body other than single-argument functions and single argument function calls. By recovering ...
0
votes
1answer
58 views

Lambda expression in ANTLR mismatched input

i want to implement a parser for lambda expressions. But i get "mismatched input ' ' expecting ')' " error for that input: (\x.x x) (\x.x x) , dont know why... I have a grammar: grammar Lambda; ...
5
votes
0answers
53 views

Is it possible to implement `max` efficiently on the untyped lambda calculus?

min is usually defined on the untyped lambda calculus as (using Caramel's syntax): sub a b = (b pred a) <= a b = (is_zero (sub b a)) min a b = (<= a b a b) This is terribly ...
0
votes
1answer
36 views

Recursion for church numerals in scheme

I have defined Church numeral zero and some other standard functions on church numerals according to Wikipedia definitions as following: (define n0 (λ (f x) x)) (define newtrue (λ(m n) m)) ...
0
votes
1answer
20 views

Does Church-Rosser theorem apply to call-by-value reduction?

I've been studying the lambda calculus and recently saw the Church-Rosser theorem. The theorem states that when applying reduction rules to terms in the lambda calculus, the ordering in which the ...
3
votes
1answer
196 views

How to substitute a variable in an expression in haskell?

I'm working with the lambda calculus implemented in haskell. Expressions: %x.e -- lambda abstraction, like \x->e in Haskell e e' -- application x,y,z -- variables succ, pred, ifzero, 0, 1, ...
2
votes
2answers
53 views

How to use AND in Oz Programming language

declare fun {Beta E} case E of lambda(X [Y Z]) andthen {IsAtom Y} then Z else nil end end {Browse {Beta lambda(y [y a]) }} I'm trying to make a beta reducer for lambda ...
11
votes
2answers
4k views

What are the state-of-art methods for solving functional equations?

Suppose that you want to find a λ-calculus program, T, that satisfies the following equations: (T (λ f x . x)) = (λ a t . a) (T (λ f x . (f x))) = (λ a t . (t a)) (T (λ f x . (f (f ...
1
vote
1answer
54 views

How to apply lambda calculus rules in Racket?

I am trying to test some of the lambda calculus functions that I wrote using Racket but not having much luck with the testcases. For example given a definition ; successor function (define my_succ ...
2
votes
0answers
27 views

Why do negative bruijn indexes show on the readback of interaction nets to λ-terms?

In order to evaluate terms of the untyped lambda calculus using Lamping's Abstract Algorithm, you have to first convert them to interaction nets, then normalize those nets, and then use a readback ...
93
votes
2answers
3k views

Why are λ-calculus optimal evaluators able to compute big modular exponentiations without formulas?

Church numbers are an encoding of natural numbers as functions. (\ f x → (f x)) -- church number 1 (\ f x → (f (f (f x)))) -- church number 3 (\ f x → (f (f (f (f x))))) -- church ...
0
votes
1answer
35 views

What type of variable is size when defined as (define size 2) in Scheme?

For Scheme, I know that variables are either bound or free. This makes sense to me, but only in the context of when we're talking about variables that are the formal parameters of procedures. A bound ...
1
vote
0answers
66 views

Is it possible to collect all redundant fan-garbage nodes on Lamping's abstract algorithm?

Lamping's abstract algorithm is an efficient way to reduce a class of terms on the pure lambda calculus. I noticed, as asked on my previous question, that just the abstract algorithm alone leaves ...
13
votes
1answer
134 views

Is it usual for interaction nets to leave piles of redundant fans?

I'm compiling lambda calculus terms to interaction nets in order to evaluate them using Lamping's abstract algorithm. In order to test my implementation, I used this church-number division function: ...
1
vote
2answers
104 views

Lambda Calculus Reductions

I am able to do simple Lambda Calculus reductions however, I can not figure out how to do the ones that obtain "currying". These are the two examples that I cannot figure out: ( ( ( lambda x . ( ...
4
votes
1answer
76 views

Why won't GHC reduce my type family?

Here's an untyped lambda calculus whose terms are indexed by their free variables. I'm using the singletons library for singleton values of type-level strings. {-# LANGUAGE DataKinds #-} {-# LANGUAGE ...
12
votes
2answers
137 views

Adventures with the untyped lambda calculus

We occasionally have people ask about implementing the untyped lambda calculus in Haskell. [Naturally, I now cannot find any of these questions, but I'm sure I've seen them!] Just for giggles, I ...
2
votes
1answer
123 views

Convert natural language into logical formula

I tried for days to write a NLTK grammar to convert simple French sentences into logical formulas. My problem can be similar with English sentences. My goal is that this grammar accepts several orders ...
2
votes
1answer
83 views

Is it possible to evaluate lambda calculus terms efficiently?

I've been writing a lot of programs in the lambda calculus recently and I wish I could run some of them in realtime. Yet, as much as the trending functional paradigm is based on the lambda calculus ...
10
votes
1answer
88 views

Correct form of letrec in Hindley-Milner type system?

I'm having trouble understanding the letrec definition for HM system that is given on Wikipedia, here: https://en.wikipedia.org/wiki/Hindley%E2%80%93Milner_type_system#Recursive_definitions For me, ...
2
votes
1answer
87 views

Haskell - polymorphism and values depending on types

From reading Wikipedia entry for lambda cube and this thread, when apply to Haskell, my understanding is that family of terms indexed by terms - typical function from value to value family of terms ...
0
votes
1answer
64 views

Reducing Complex DCGs Prolog

How do I reduce a DCG rule like this dtv(P1^P2^P3^Q1) using apply(X^P,X,P)? I'm trying to describe the semantics of different grammatical components and I'm using lambda calculus. This is what I ...
3
votes
2answers
100 views

How do you represent nested types using the Scott Encoding?

An ADT can be represented using the Scott Encoding by replacing products by tuples and sums by matchers. For example: data List a = Cons a (List a) | Nil Can be encoded using the Scott Encoding as: ...
5
votes
1answer
100 views

Is there any non-recursive term that folds over a scott-encoded list?

Suppose that I have a scott-encoded list such as: scott = (\ c n -> c 1 (\ c n -> c 2 (\ c n -> c 3 (\ c n -> n)))) I want a function that receives such kind of list and converts it to ...