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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votes
4answers
44 views
Python lambda expression compose iterator script
I'm writing a python script that should take a list of functions, written as lambda expressions, and return the compose of all the function, but, I have an arrow in the script, maybe because of the ...
5
votes
1answer
122 views
Beta reduction in lambda calculus using Haskell
I have defined the following functions for beta reduction but i'm not sure how to consider the case where free variables get bounded.
data Term = Variable Char | Lambda Char Term | Pair Term Term ...
4
votes
1answer
82 views
Alpha conversion on a Haskell expression
Given a Haskell expression, I'd like to perform alpha conversion, ie. rename some of the non free variables.
I've started implementing my own function for this, which works on a haskell-src-exts Exp ...
1
vote
0answers
46 views
Are there a lambda-mu expression equivalent to the yin yang puzzle? [migrated]
The yin yang puzzle was written in Scheme. Since it uses call/cc, it is not possible to express it in a pure lambda expression, unless we do a CPS transform.
However, given the fact that λμ-calculus ...
0
votes
0answers
37 views
Sequence operator and error term
I am trying to express sequence operator
g*f = λz.(g z = error) -> error, (f o g)z
where
f o g = λz.f(g z)
using delegates for constructing lambda expressions in C#
public delegate Lambda ...
12
votes
2answers
183 views
η-expansion in a pure functional language
In OCaml, it is legal to have in .mli:
val f : 'a -> 'a
val g : 'a -> 'a
and .ml:
let f x = x
let g = f
Yet in F#, this is rejected:
eta_expand.ml(2,5): error FS0034: Module 'Eta_expand' ...
5
votes
2answers
97 views
Church Numerals convert to int without language primitive
Is it possible to convert a church numeral to an integer representation without using a language primitive such as add1?
All the examples I've come across use a primitive to dechurch to int
Example:
...
0
votes
1answer
26 views
Lambda reductions prove S K = K I
Hello I am having trouble proving these combinators S K = K I
The steps with the brackets [] are just telling you the step i am doing. For example [λxy.x / x] in λyz.x z(y z) means I am about to ...
3
votes
1answer
59 views
Lambda Calculus Expression Test-bed?
I would like to test out the Lambda Calculus interpreter that I've written against a fairly large test set of Lambda Calculus expressions. Does anyone know of a Lambda Calc expression generator I can ...
1
vote
1answer
56 views
Lambda Calculus Free Variable Issue
I found Mike Gordon's Introduction to Functional Programming Notes on the web and I'm trying to work through it. On page 9 there's this question:
Find an example to show that if V1 = V2 , then even ...
13
votes
2answers
332 views
Understanding Polytypes in Hindley-Milner Type Inference
I'm reading the Wikipedia article on Hindley–Milner Type Inference trying to make some sense out of it. So far this is what I've understood:
Types are classified as either monotypes or polytypes.
...
1
vote
2answers
300 views
Is My Lambda Calculus Grammar Unambiguous?
I am trying to write a small compiler for a language that handles lambda calculus. Here is the ambiguous definition of the language that I've found:
E → ^ v . E | E E | ( E ) | v
The symbols ^, ., ...
0
votes
1answer
166 views
Finding out lambda calculus/haskell type of some example
Suppose that the function gets as its input two variables of different types (e.g. one variable is int in the language of C, and one variable is char in the language of C) and returns one variable ...
2
votes
2answers
175 views
Haskell/lambda calculus types example
Suppose that the Haskell or lambda calculus presents the following fuction types:
A -> B -> C
(A -> B) -> C
How are these two different?
1
vote
1answer
80 views
Find a normal form using beta reduction
Given the following expression :
((λx.λx.xx) (λx.xzx)) (λy.yy)
I want to find its normal form using beta reduction.
My calculation :
((λx.λx.xx) (λx.xzx)) (λy.yy) ->
((λx.xzx)(λx.xzx)) ...
0
votes
2answers
83 views
Functional programming and the closure term birth
I'm studying functional programming and lambda calculus but I'm wondering
if the closure term is also present in the Church's original work or it's a more modern
term strictly concerned to programming ...
0
votes
1answer
81 views
uncurry and curry functions [closed]
I´m quite new to lambda-calculus and I´m trying to do the following exercise, but I´m not able to resolve it.
uncurry(curry E) = E
Could anyone help me?
1
vote
1answer
66 views
How to interpret a lambda calculus expression?
say I am given the expression (i will refer to l as lambda):
lx.f1 f2 x
where f1 and f2 are functions and x suppose to some number.
how do you interpret this expression? is lx.(f1 f2) x the same as ...
2
votes
2answers
196 views
Beta reduction in lambda calculus: Order of evaluation important?
Given the following lambda expression, where \ resembles lambda:
(\kf.f(\c.co)km)(\x.dox)(\le.le)
Is it wrong if I convert (\c.co)k into ko? I did that and apparently, it was wrong. The right way ...
2
votes
1answer
368 views
Implementing call-by-value lambda-calculus in Haskell
When implementing call-by-value lambda-calculus in Haskell, should I force the evaluation of the arguments to a function in the object language (i.e., the call-by-value lambda-calculus) to get around ...
1
vote
2answers
55 views
How to evaluate an expression using β reduction in lamdba calculus?
I want to evaluate the following expression :
(λx.y)((λz.zz)(λw.w))
using β reduction .
The answer is :
(λx.y)((λz.zz)(λw.w)) ->
(λx.y)((λw.w)(λw.w)) ->
(λx.y)(λw.w) -> y
But I don't ...
0
votes
4answers
153 views
What are the correct semantics of a closure over a loop variable? [closed]
Consider the following lua code:
f = {}
for i = 1, 10 do
f[i] = function()
print(i .. " ")
end
end
for k = 1, 10 do
f[k]()
end
This prints the numbers from 1 to 10. In this ...
0
votes
0answers
92 views
Turing machine in lambda calculus? [closed]
It was once explained in here that this is quite easy to construct Turing machine in lambda calculus, but I don't understand how it would work. I don't ask for direct lambda expression simulating TM, ...
2
votes
3answers
119 views
What does the use of multiple lambdas in scheme mean?
I am currently learning scheme and I came across these functions:
(define t (lambda (x) (lambda (y) x)))
(define f (lambda (x) (lambda (y) y)))
Apparently they are representations of true and ...
7
votes
2answers
443 views
Defining a stack data structure and its main operations in lambda calculus
I'm trying to define a stack data structure in lambda calculus, using fixed point combinators. I am trying to define two operations, insertion and removal of elements, so, push and pop, but the only ...
3
votes
1answer
186 views
Free variables list of a lambda expression
I was just doing some homework for my upcoming OCaml test and I got into some trouble whatnot.
Consider the language of λ-terms defined by the following abstract syntax (where x is a variable):
...
10
votes
5answers
456 views
In pure functional languages, is data (strings, ints, floats.. ) also just functions?
I was thinking about pure Object Oriented Languages like Ruby, where everything, including numbers, int, floats, and strings are themselves objects. Is this the same thing with pure functional ...
2
votes
1answer
80 views
How do you convert to lambda syntax?
Part of a question I'm trying to understand involves this:
twice (twice) f x , where twice == lambda f x . f (f x)
I'm trying to understand how to make that substitution, and what it means.
My ...
1
vote
1answer
235 views
Lisp IF-THEN-ELSE Lambda Calc Implementation
I made this IF-THEN-ELSE Lambda Calculus code
(defvar IF-THEN-ELSE
#'(lambda(con)
#'(lambda(x)
#'(lambda(y)
#'(lambda(acc1)
#'(lambda ...
2
votes
1answer
153 views
CLISP Lambda Calculus Div Implementation
I'm trying to implement a Division function with clisp Lambda Calc. style
I read from this site that lambda expression of a division is:
Y (λgqab. LT a b (PAIR q a) (g (SUCC q) (SUB a b) b)) 0
...
0
votes
1answer
108 views
Lambda Calculus CONS Pair implementation with Lisp
I'm trying to implement a Church Pair Lambda Calc. style with CLisp.
According with Wikipedia:
pair ≡ λx.λy.λz.z x y
So far, this is my code:
(defvar PAIR
#'(lambda(x)
...
1
vote
1answer
108 views
Lambda Calculus AND Implementation in CLISP
I'm very new with functional programming, lisp and lambda calculus. Im trying to implement the AND operator with Common Lisp Lambda Calc style.
From Wikipedia:
AND := λp.λq.p q p
So far this ...
0
votes
1answer
99 views
Lambda calculus in practice [closed]
How to choose a language, a lambda term (λx.y)((λx.xxx)(λx.xxx)) actually calculated? In other words, need a language to the normal order reduction and the weak type system.
0
votes
1answer
190 views
END OF FILE token with flex and bison (only works without it)
OK this is kind of an odd question because what I have here works the way I want it to. What I'm doing is writing a parser for a lambda calculus expression. So an expression can be one of four things:
...
6
votes
3answers
305 views
Can any function be reduced to a point-free form?
Many functions can be reduced to point free form - but is this true for all of them?
E.g. I don't see how it could be done for:
apply2 f x = f x x
2
votes
3answers
158 views
Python: nested lambdas — `s_push: parser stack overflow Memory Error`
I recently stumbled across this article which describes how to code FizzBuzz using only Procs in Ruby, and since I was bored, thought it would be neat to try and implement the same thing in Python ...
5
votes
2answers
245 views
Conversion from lambda term to combinatorial term
Suppose there are some data types to express lambda and combinatorial terms:
data Lam α = Var α -- v
| Abs α (Lam α) -- λv . e1
| App (Lam α) (Lam α) ...
15
votes
2answers
703 views
Lambda calculus in Haskell: Is there some way to make Church numerals type check?
I'm playing with some lambda calculus stuff in Haskell, specifically church numerals. I have the following defined:
let zero = (\f z -> z)
let one = (\f z -> f z)
let two = (\f z -> f (f ...
2
votes
0answers
69 views
Lambda Calculus simplification [closed]
Below is the lambda expression which I am finding difficult to reduce i.e. I am not able to understand how to go about this problem.
(λmn(λsz.ms(nsz)))(λsz.sz)(λsz.sz)
I am lost with this.
if ...
0
votes
1answer
30 views
What is the meaning of application without abstraction in the left part?
Lambda term can be:
variable
lambda abstraction (for example \x.t)
application. If t and s are lambda terms, then ts is an application.
So, application with abstraction in the left part (for ...
0
votes
1answer
195 views
Lambda Calculus: alpha conversion
This is an alpha conversion. Although I have completed this, I am not too sure whether this is a correct answer or not.
λx y.((λx y.x) x ((λx. x) y)) ((λx y. y)((λy. y) x) y)
=λx y.((λx1 y1. x1) ...
18
votes
2answers
720 views
Why can't (Set -> Set) have type Set?
In Agda, the type of a forall is determined in such a way that the following all have type Set1 (where Set1 is the type of Set and A has type Set):
Set → A
A → Set
Set → Set
However, the following ...
0
votes
2answers
157 views
Library to do some 'lambda calculus' in java
I am planning to do some basic lambda-expressions manipulation (preferably using typed lambda) in Java.
Is there a library (stable or otherwise) which I use?
UPDATE : To state is more explicitly, I ...
2
votes
1answer
72 views
function returns value without replacing the variable with the given parameter
sry about the stupid way I phrased the question here's some explanation: I am experimenting with lambda-calculus in javascript and I am having some minor difficulties. (you don't have to know anything ...
1
vote
1answer
149 views
exposing the structure of inductively defined terms in coq
The proof that typing derivations are unique in the simply-typed lambda calculus is trivial on paper. The proof that I am familiar with proceeds by complete induction on typing derivations. However, I ...
2
votes
1answer
97 views
Equivalence of models of computation
I'm seeking explanation on how one could prove that models of computation are equivalent. I have been reading books on the subject except that equivalence proves are omitted. I have a basic idea about ...
1
vote
1answer
120 views
What is Lambda definability?
While I was reading about lambda calculus, came across the word Lambda definability. Can someone please explain what that is as I couldn't find any good resources on that.
Thanks
1
vote
1answer
108 views
Lambda calculus reduction of functions
I'm very new to lambda calculus and while I was reading a tutorial , came across with this.
Here is my equation.
Y = ƛf.( ƛx.f(xx)) ( ƛx.f(xx))
Now if we apply another term, let's say F (YF), then ...
4
votes
3answers
341 views
What is meant by “Capture-avoiding substitutions”?
While reading the Lambda Calculus in Wiki, came across the term Capture-avoiding substitutions. Can someone please explain what it means as I couldn't find a definition from anywhere.
Thanks
PS
...
11
votes
1answer
243 views
How to find the optimal processing order?
I have an interesting question, but I'm not sure exactly how to phrase it...
Consider the lambda calculus. For a given lambda expression, there are several possible reduction orders. But some of ...
