# Questions tagged [lambda-calculus]

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

lambda-calculus

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### How do parentheses work in Lambda Calculus Reduction?

Okay so I'm just learning some lambda calculus and I came across this problem.
Perform reduction on this - if it cannot be reduced then say it will diverge
(λy.(λx.xx)y)(λx.x)
These are the steps I ...

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### How could this Y' same as this Y combinator itself?

I see this in wiki:
Y' = SSK(S(K(SS(S(SSK))))K)
And I understand why it corresponds to this lambda expression Y' = (λab.aba) (λab.a(bab))
But I don't know how can this same as X = λa.(λx.xx)(λx.a(xx))...

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### Type information system recovery

I'm reading the TIE: Principled Reverse Engineering of Types in Binary Programs paper
and I'm having hard time understanding one of the key algorithms presented in it, specifically in the equality ...

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### mock - church numerals?

pls somebody help me in clarifying a question about curch numerals.
I've coded an algorithm to interprete a lambda expression as a church numeral (i.e. puts out the corresponding integer). The ...

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### beta-equivalence, beta-reduction and transitive+reflexive beta-reduction

I'm taking an intro course in Lambda calculus and I cannot understand why in the following exercise, the first two sentences are false and only the last one is true:
λx.x β
λx.x: False
λx.x -β λx.x: ...

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### Overlapping Days Calculation Nightmare

There are 3 tables, 1) Slots, 2) Overlapping Dates and their Owners, 3) Owners Factors
I need to calculate (preferrably using a spill formula, but not mandatory) for each Slot (table 1) the number of ...

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### Lambda Calculus - Evaluating Custom Rewrite Rules to Increment

I am working with this set of rewrite rules for lambda calculus:
While evaluating "INC 0", I performed these steps:
Subsequently, I evaluated "INC 1" as such:
Are these ...

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### Is it possible, using PHOAS, to evaluate a term to normal form, and then stringify it?

From this Haskell Cafe post, and borrowing some code examples from jyp, we can construct a simple PHOAS evaluator in Haskell as:
{-# LANGUAGE GADTs #-}
{-# LANGUAGE RankNTypes #-}
import Data.Char
...

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### Are numbers also functions in functional programming?

I have been taught in my Bsc course that in functional programming even numbers are functions that return themselves. I've read that lambda calculus consists only of functions and nothing else, so ...

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### Valid Lambda Expressions [closed]

I have two questions about the validity of lambda expressions.
First, is a variable on its own a valid lambda expression (ex: λx)
Second, take for example these two lambda expressions (λx.fxya and λz....

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### 'Segmentation Fault' occurred when Lambda Function in Python recurves over 1e5 times

def count_cond(condition):
return lambda x:(((lambda f:(lambda a:f(a(a)))(lambda a:f(lambda *w:a(a)(*w))))(lambda cc: lambda j,m: ((cc(j+1,m+1) if condition(x,m)==True else cc(j,m+1))) if m<=x ...

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### Why Rust fails when I try to implement recursion with "S I I" from SKI-calculus?

Note: I took definitions of S and I from here: https://en.wikipedia.org/wiki/SKI_combinator_calculus#Informal_description
So S xyz = xz(yz), or in Rust:
fn s <Z, Y, X> (
x: fn(Z) -> fn(Y) ...

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### Do you multiply or add when simplifying λ-expressions?

The question is to simplify this λ-expression
(λx. x) (λx. λy. y x) 8 (λx. x + 1)
My current thinking is as follows
(λx. x) (λx. λy. y x) 8 (λx. x + 1) = (λx. λy. y x) 8 (λx. x + 1)
(λx. λy. y x) 8 (...

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### How does "true" evaluate in the lazy lambda calculus?

In the lambda calculus, "true" is defined as a function that takes two arguments but returns the first one:
true = \x.\y.x
What happens if you evaluate this lazily after giving it only one ...

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### What is (Y Y), the Y-combinator applied to itself?

In Chapter 9 of The Little Schemer, the authors introduce the Y-combinator and the penultimate question asks: "What is (Y Y)". They answer: "Who knows, but it works very hard."
I ...

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### How to prove Theorem euclid_gcd : forall a b z, euclid a b z -> gcd a b z. using coq?

I am trying to prove euclid_gcd Theorem but Im getting stuck at the second case of the induction. most of the time I'm getting unify errors.
I will be glad for some help please.
Require Import Arith....

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### Not returning all possible one-step reductions for combinatory expressions

I'm trying to implement combinatory logic in Haskell, and am currently writing a function step, which returns a list of all possible one step reductions using the standard reduction rules. When ...

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### Exception handling in lambda calculus and functional programming

Is there a way to model exception handling in lambda calculus?
I'm asking this because it is very common to see multiple ways in handling exception states in procedural languages and derivative ...

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### Encoding pair in lambda calculus

I am confused about the logic behind how lambda calculus encodes the pair data structure.
In lambda calculus, PAIR is encoded as
PAIR := λx.λy.λf. f x y
.
Why can't I just encode it as
PAIR := λx....

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### Lambda Expression simplification

Is \xy.xy the same as \x.x?
I have to simplify an expression as much as possible and I don’t understand if these are equivalent

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### How to implement a fast type inference procedure for SKI combinators in Python?

How to implement a fast simple type inference procedure for SKI combinators in Python?
I am interested in 2 functions:
typable: returns true if a given SKI term has a type (I suppose it should work ...

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130
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### Lambda calculus implementation using CBV small step operational semantics

I'm trying to implement an interpreter for the lambda calculus that has constant intergers and supports the addition operation. The interpreter should use the call-by-value small-step operational ...

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117
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### Applying a function in a nested context to a value in a nested context in haskell

Consider the following Applicative context f. I have a list of functions wrapped around this context F = f [a -> a] and a list of values wrapped around the same context i.e. V = f [a]. Now I want ...

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### Typed Lambda Calculus

I want to find the type of the lambda expression \x y -> x y y. I proceed as follows.
We go in the reverse order of operations and "unpack" the expression. Assume the whole expression ...

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168
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### How to implement the next type inference in Haskell?

I am interested to derive a most general type of a hidden function from (input, output) pairs. Meaning we have types of input and output but do not have access to function.
All input, output and ...

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3
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173
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### How to implement SKI combinators in Prolog?

I want to implement SKI combinators in Prolog.
There are just 3 simple rules:
(I x) = x
((K x) y) = x
(S x y z) = (x z (y z))
I came up with the following code by using epilog:
term(s)
term(k)
term(...

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### python lambda : maximum recursion depth exceeded in comparison

I wrote the following code in Python:
func = lambda x : x * 2
func = lambda x : func(x)
func(6)
When I ran the code above, I got
RecursionError: maximum recursion depth exceeded in comparison
I ...

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2
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### How do I do this reduction?

I'm stuck on how to do this reduction, I have read this post and this pdf but I can't seem to find a solution:
(λx.yx)((λy.λt.yt)zx)=> (λx.yx)(λt.zxt) => y(λt.zxt)
but the solution should be yx ...

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1
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217
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### Writing lambda calculus higher order recursion scheme in Haskell

[I'm on new grounds here, there might be some ambiguities]
Consider the recursor (which is a generalization of primitive recursion over higher types)
R_\sigma A B 0 = A
R_\sigma A B (S(C)) = B(R_\...

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1
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### Are both of these ways correct to do beta reduction?

First way: (λz.(λx.x) z) -> (x)[x->z] -> (λz.z)
Second way: (λz.(λx.x) z) -> (λx.x)[z->z] -> (λx.x)
Any lambda calculus online calculator I'm using only provides the first way as a ...

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### Can i use Lambda Expression in jdk8，Implement a generic function to calculate way

Like this
1.f(x,y)=ax+by
2.f(x,y,z)= ax+by+cz
3.f(2x,2y) = ax^2+by^2
....
4.f(2x,y,3z,4m,5n) = ax^2+by+cz^3+dm^4+en^5
My idea is as follows
this java method named myFun()()()
1.myFun(x,y)(1,2)(3,4) ...

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### How would the factorial using y-combinator simplify after repeated substitutions? [duplicate]

I am playing around with understanding how the Y-combinator works in functional programming. I have a basic factorial function which I have translated to:
console.log((f => n => (n===0) ? 1 :...

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### How to encode two distinct Unit types using church encoding

I was studying Haskell and happened to know the church encoding of algebraic data types. For example, the unit type in Haskell can be encoded as a polymorphic function type. But one can also define a ...

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### Defining lambda addition without using the successor function

I am familiar with defining the ADD function on top of the SUCC function, such as in the following:
const ONE = f => a => f(a);
const SUCC = n => f => a => f(n(f)(a)); // ...

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### beta-reduction in lambda-calculus

I am extremely confused about this one.
Given the following rule ("Type and Programming Languages", Benjamin Pierce, page 72):
(λx.t)v2 -> [x -> v2]t (* E-AppAbs*)
Later in the same ...

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2
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### What are the inner workings of this lambda expression inside the filter function?

I have functions defined as follows:
distance3 :: String -> String -> Float
distance3 x y = fromIntegral $ abs $ length x - length y
distanceFilter :: (String -> String -> Float) -> ...

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1
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### Concatenation of 2 lists in lambda-calculus

I have defined the type of a polymorphic list and its constructors, and now trying to
write a fonction that concatenate 2 lists but my function concat does not work
Definition listA A :Set :=
...

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### Number of element in a list in lambd-calculus?

I am coding polymorphe lists in coq and I have defined the type as
Definition listA A :Set :=
forall T :Set, T -> (A -> T -> T) -> T.
(* empty list*)
Definition pnil (A :Set) : listA A ...

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### how to create a polymorphe couple such as "( a : type A, b : type B ) " in lambda-calculus

I am working on a project in Lambda-calculus and i am trying to code polymorphe couple with coqide
but a have a problem coding the constructor that respect the type pprod
Definition pprod : Set -> ...

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1
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### Haskell: a for loop for a REPL [closed]

I am trying to write a something like a repl in Haskell and I want to replicate this code in C:
for (int c = getc(stdin); c != 'e'; c = getc(stdin)) {
printf("I got %c!\n", c);
}
I ...

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### Writing a more strongly typed interpreter

I have the following numerical expression interpreter (simplified example)
data Node x
= Symbol String -- A parsed word coming from Python: syntactic category, feature list, source text
| ...

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### Why are normal and applicative order evaluation named as such?

While I somewhat understand the differences between the two methods of evaluation, I am trying to understand the meaning inherent in their names. Why name it 'normal' order, what norm is being adhered ...

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252
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### What is the relation between a function with free variables and a closure? [closed]

Are free variable(s) in a function the thing(s) "closed" upon in a closure?

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### How do you reduce this lambda calculus expression?

How do you reduce this lambda calculus expression?
I am trying to reduce NOT FALSE to TRUE with lambda calculus with the given definitions:
NOT = (λb.λx.λy.b y x)
FALSE = (λx.λy.y)
TRUE = (λx.λy.x)

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196
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### Haskell Function returning its input

I'm currently writing a function for substitution (Lambda Calculus) based in Haskell.
data Term = Var String
| Application Term Term
| Lambda String Term
The function takes in a ...

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1
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### Haskell expression to find free variables (Lambda Calculus) [closed]

Given the following definition for a Term:
data Term = Var String | Application Term Term | Lambda String Term
How would I extract the free variables in the term to a list?
I'm working with this ...

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### How does this S-K completeness rule work in Combinatory logic?

Wikipedia lists this rule as part of the S-K completeness basis:
T[λx.λy.E] => T[λx.T[λy.E]] (if x occurs free in E)
T[] is a "term rewriter" that converts from a lambda term to the ...

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485
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### Implementing SKI transformation

I need to implement the following algorithm in order to convert Lambda Calculus into Combinatory Logic.
The rules are from https://en.wikipedia.org/wiki/Combinatory_logic#Completeness_of_the_S-K_basis
...

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92
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### Beta Reduction steps on Y combinator

I am new to studying Lambda Calculus as part of my CompSci degree. In the course material (this is not a graded assignment no worries!) the following beta reduction came up:
𝜆𝑓.𝑊𝑊 →𝛽 𝜆𝑓.𝑓(𝑊𝑊)...

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### Writing the Z combinator in Ocaml

I'm new to lambda calculus, and I find the grammar sometimes ambiguous to me.
Specifically, I'd like to know how to understand the Z combinator:
Z = λ f. (λ x. f (λ v. xxv)) (λ x. f (λ v. xxv))
How ...