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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How to make a substitution in Lambda Calculus?

I would like to know how to make the following lambda substitution: Let: M = λxy.x (λx.x)(λy.x y) Calculate the substitution: M[x := y xλz.z] Do you know some way to make such substitution in ...
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What is the right way to typecheck dependent lambda abstraction using 'bound'?

I am implementing a simple dependently-typed language, similar to the one described by Lennart Augustsson, while also using bound to manage bindings. When typechecking a dependent lambda term, such ...
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23 views

How get Y combinator through S combinator or others?

I have the equation Y = FY (fixed point equation). How to get of it the equation for F through other combinator (in particular S- combinator with first fixed parameter)?
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Isabelle/HOL proof of normalization of simply typed lambda calculus with pairs

Is there a formalization in Isabelle/HOL of the strong normalization property of the simply typed lambda-calculus with pairs? I am aware of the development in ~~/src/HOL/Proofs/Lambda/StrongNorm.thy, ...
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Showing equality of two lambda calculus expressions

I need to show the beta-equality of three lambda terms, but I'm not able to: 1) (λx y z:(xz)(yz)) λu:u =β (λv:v λy z u:u) λx:x 2) (λx y:x λz:z) λa:a =β (λy:y)λb z:z 3) λx.Ω =β Ω Can someone help ...
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Is it possible to showcase the different strategies of evaluation by modifying this simple reducer?

I am the kind that prefers learning by looking at code instead of reading long explanations. This might be one of the reasons I dislike long academic papers. Code is unambiguous, compact, noise-free ...
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34 views

Expanding Recursive Functions In Coq

Background I understand that Iota reduction is used to reduce/expand recursive functions. For instance, given the following application of a simple recursive function (factorial over natural ...
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How would the Lambda Calculus add numbers?

I've been reading about the lambda calculus, and love the ideas proposed by it, but there are some things I just can't explain; How would the lambda calculus go about adding numbers? I understand ...
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Types à la Curry in Simply Typed Lamba Calculus

I'm writing a toy theorem prover with Haskell following the model of L.Paulson; one of the creators of Isabelle. According to one of his articles, a theorem prover may be built with the Simply Typed ...
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how to partially apply arbitrary argument of a function?

I want to use partial from functools to partially apply a function's second argument, I know it is easy to do with lambda rather than partial as follows >>> def func1(a,b): ... return ...
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convert flip lambda into SKI terms

I'm having trouble converting the lambda for flip into the SKI combinators (I hope that makes sense). Here is my conversion: /fxy.fyx /f./x./y.fyx /f./x.S (/y.fy) (/y.x) /f./x.S f (/y.x) /f./x.S f (K ...
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Obtaining the predicates in a Lambda Calculus Expression

What would be the code to obtain the predicate in a given lambda calculus expression. Given the lambda expression (race(x) & run(I2,x)) I know that race and run are predicates. How would I ...
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Is it possible to implement a function that returns an n-tuple on the lambda calculus?

An n-tuple on the lambda calculus is usually defined as: 1-tuple: λ a t . t a 1-tuple-fst: λ t . t (λ a . a) 2-tuple: λ a b t . t a b 2-tuple-fst: λ t . t (λ a b . a) 2-tuple-snd: λ t . t (λ ...
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reading a lambda terms in Haskell

I have a lambda terms defined as follows: type Symb = String infixl 2 :@ data Expr = Var Symb | Expr :@ Expr | Lam Symb Expr deriving Eq And i need to write instances for ...
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In Erlang, passing a message to all elements of a list of pids

I am trying to build a very simple barrier-synchronization server, where the server is initially fed a number of processes that will be communicating with it. When a process is done, it receives a ...
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How do you translate from lambda terms to interaction nets?

On this paper, the author suggests a translation between lambda terms: data Term = Zero | Succ Term | App Term Term | Lam Term and interaction nets: data Net = -- if I understood correctly ...
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How to implement an optimal beta reduction on Levy's sense? [closed]

In 1990, John Lamping published a paper proposing an optimal implementation of the untyped lambda calculus. Since that paper is 25 years old, I wonder how much we have advanced since. Thus, my ...
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Access outer variable inside a block and Y-combinator

I hope you all to be fine. I'm implementing the fixed-point Y-combinator in Harbour and I'm having some troubles with it. Well, the Y-combinator can be defined by the lambda-calculus as: Y = ...
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How to manually manipulate precedence of special expressions in Parsec?

I tried to write a parser for a lambda-calculus interpreter that uses the expression closures grammars of JavaScript 1.8, which means function(x) x * x same with function(x) { return x * x; }. Here ...
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Difference between call-by-value and call-by-name interpreter for the lambda calculus

In another question, Bob presented the following interpreter for the untyped lambda calculus. data Expr = Var String | Lam String Expr | App Expr Expr data Value a = V a | F (Value a -> Value a) ...
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What is the name of the lambda notation that uses integer offsets to refer to implicit single arguments?

Looks kind of like this (the example shows church numerals and the Y-combinator): zero := λ.λ.0 one := λ.0 -- or more verbosely: λ.λ.1 0 two := λ.λ.1 (1 0) three:= λ.λ.1 (1 (1 0)) add ...
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interpret Parigot's lambda-mu calculus in Haskell

One can interpret the lambda calculus in Haskell: data Expr = Var String | Lam String Expr | App Expr Expr data Value a = V a | F (Value a -> Value a) interpret :: [(String, Value a)] -> Expr ...
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What is a mapping between natural numbers and valid simply typed lambda calculus terms?

Is there any efficient algorithm that maps between well-typed, closed terms of the simply typed lambda calculus and natural numbers? For example, using bruijn indexes (and probably on incorrect ...
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Lambda Calculus beta reduction

I have the following lambda calculus: ( x ( λyz.xz ) ( λxy.zyx )) (( λyx.xyz ) ( λy.xz )) which I already reduced: alpha => ( x ( λyz.xz ) ( λxy.zyx )) (( λyx1.x1yz )) ( λy.xz )) beta => ( ...
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How to create function extensions / function interfaces / classes of functions in Python or functional programming languages?

Would like to define something I'd best call 'function extension' / 'function interface' or 'class of functions' in Python. Haven't seen similar constructs in other languages, but I'm no expert in ...
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Declarative Models of Computation in Physical Machines

I've been studying Models of computation lately and i came up with a question. For many models of computation, it seems like it is possible to implement them in physical machines. Some in fact, ...
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Haskell utility to make function point free [closed]

I'd like to quickly and correctly reduce functions to point free form in Haskell. I'd prefer to produce fairly readable outcomes. How should I go about this?
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How to correctly curry a function in JavaScript?

I wrote a simple curry function in JavaScript which works correctly for most cases: var add = curry(function (a, b, c) { return a + b + c; }); var add2 = add(2); var add5 = add2(3); ...
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63 views

Parsing and implementing a lambda calculus in Rascal

I am trying to implement a lambda calculus inside of Rascal but am having trouble getting the precedence and parsing to work the way I would like it to. Currently I have a grammar that looks something ...
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Lambda Calculus and Y-Combinator with CoffeeScript

I am trying to implement a factorial function with lambda calculus in CoffeeScript: Basicly I created a fiddle for the issue: http://jsfiddle.net/turhn/fy548rj0/1/ Actually the yCombinator works ...
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How to compile Haskell into the untyped lambda calculus (or GHC core)?

I'm looking for ways how to convert a simple Haskell program (no imported libraries, just data types and pure functions) into a term of the untyped lambda calculus. A promising approach seems to be to ...
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Generating Church Encoded Numbers for Arbitrary Integers in Javascript [closed]

I want a function that takes an integer and returns that number in the form of a church encoded function. I have achieved this in newlisp: (define (reduce stencil sq) (apply stencil sq 2)) (define ...
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Turing Machines and Lambda Calculus equivalence

I am wondering can anyone explain to me in general terms, some proofs of the equivalence of Lambda calculus and turing machines and the general method of the proof. In as plain terms as possible.
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Lambda calculus entire expression substitution

About substitution of free occurances: can we have a substitution of an entire expression(function, application), or just of a variable: Example: Current expression \x.\y.(y, z) Expression to be ...
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Lambda-Calculus Representation in NLTK CCG

I am trying to implement a probabilistic ccg with lambda-calculus features. Basically i want to do the following code: >> lex = parseLexicon(r''' :- S,NP He => NP {sem=\x.he(x)} [1.0] ...
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Integer arithmetic counting using Lambda calculus

If anyone have idea that how to show an encoding of integer arithmetic counting using Lambda calculus?
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trying to understand church encoding in Scheme

I'm trying to understand the whole principal of church encoding through Scheme. I think I understand the basics of it such as Church numeral for 0 (define c-0 (lambda (f) (lambda (x) x))) Church ...
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Is that possible to implement a stack with lambda expressions only?

This might not be a very practical problem, I'm just curious if I can implement a stack with only lambda expressions. A stack supports 3 operations: top, pop and push, So I begin with defining the ...
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Why closure use seems so “chicken or egg”

I've read and somewhat understand Use of lambda for cons/car/cdr definition in SICP. My problem is understanding the why behind it. My first problem was staring and staring at (define (cons x y) ...
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Why does the y-combinator provide Turing equivalence?

This answer says Here is a basic y-combinator in lambda calculus: Y f = (\x -> f (x x)) (\x -> f (x x)) Ie Something like this in Clojure: (defn Y [f] ((fn [x] (x x)) (fn [x] (f ...
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Assigned Anonymous Functions vs Named Function Declarations

In developing a functional programming language, is it possible to make assigned anonymous function expressions equivalent to named function declarations/definitions? For example in this pseudo ...
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Haskell - How to write twice function using (.) f g - function composition

Here is the problem, i need to write the well known twice function (twice= \x-> \x-> x) but this time using (.) composition function like (.) f g. I don't know how to solve it, cause I ...
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179 views

Function closure versus continuation, in general and SML

I'm starting to doubt I really understand this topic. Until now, I was understanding a continuation as calling a function with closure (typically returned by another function). But MLton seems to ...
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Is my alternate definition of scc in the lambda calculus correct?

scc is a combinator (successor) that takes a Church Numeral n and returns another Church numeral. We have in mind that church numerals are defined as follows: c_0 = λs. λz. z; c_1 = λs. λz. s z; c_2 ...
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Checking understanding of: “Variable” v.s. “Value”, and “function” vs “abstraction”

(This question is a follow-up of this one while studying Haskell.) I used to find the notion between "variable" and "value" confusing. Therefore I read about the wiki-page of lambda calculus as well ...
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In lambda calculus, can variable be expression in general?

For better understanding of functional programming, I am reading the wiki page for lambda calculus here. The definition says: If x is a variable and M ∈ Λ, then (λx.M) ∈ Λ Intuitively I ...
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Add4 Using Lambda Expression

I know that using lambda expressions, we can write succ = λnfx • f (n f x ) and twice = λfn • f f(n ). My aim now is to write add4 using these two which adds 4 to the church numerals. How do I write ...
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Lazy evaluation and nested thunks eating up memory

I'm working on a tiny lambda calculus engine which I want it to be lazy as Haskell. I'm trying to, at least for now, stick to Haskell's rules so that I don't have to rethink everything, but I don't ...
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How did Haskell add Turing-completeness to System F?

I've been reading up on various type systems and lambda calculi, and i see that all of the typed lambda calculi in the lambda cube are strongly normalizing rather than Turing equivalent. This includes ...
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Functional “simultanity”?

At this link, functional programming is spoken of. Specifically, the author says this: Simultaneity means that we assume a statement in lambda calculus is evaluated all at once. The trivial function: ...