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.
Application has higher precedence than abstraction.
In this sense, what is lambda calculus abstraction? I'm confused at what there is to have precedence over?
Specifically, if I defined K as
K2 = λx. (λy. y)
K = λx. (λy. x)
would the SK(I) calculus still be Turing complete? My guess is "no," just because I can't seem to be able to construct ...
I am writing an interpreter for the lambda calculus in C#. So far I have gone down the following avenues for interpretation.
Compilation of terms to MSIL, such that lazy evaluation is still preserved....
In the following code, the statement add'_commut is accepted by Coq but add_commut is rejected because of a universe inconsistency.
Set Universe Polymorphism.
Definition nat : Type := forall (X : ...
Asking the GHC to print the type of "one" and "succ zero" (lambda calculus way of encoding numerals), I get two different types!
Shouldn't they be the same?
Can you also show me how to derive its type ...
While learning Haskell, I came across a challenge to find two functions f and g, such that f g and f . g are equivalent (and total, so things like f = undefined or f = (.) f don't count). The given ...
In my understanding, to exploit the spectre vulnerability you need a language with an execution semantics close enough to the hardware to be able to introduce branches at will.
Semantics of typed ...
Given two lambda terms, let's say they are equal if their (possibly infinite) Bohm trees are. Under this definition, for example, (Y λr.λt.(t r)) and (Y λr.λt.t (λt. t r) are equal, despite not having ...
My task is to implement the factorial function using just a lambda expression.
Here's what I have tried
fact = lambda n: if n == 0 return 1 else ...
fix if statement syntax error
t2 = (\x y z-> x.y.x)
GHCI shows me this:
t2 :: (b1 -> b2) -> (b2 -> b1) -> p -> b1 -> b2
I can't quite grasp it how this type signature comes to be. So far I've figured that ...
I want to understand how let bindings work in Haskell (or maybe lambda calculus, if the Haskell implementation differs?)
I understand from reading Write you a Haskell that this is valid for a single ...
In a previous question SystemT Compiler and dealing with Infinite Types in Haskell I asked about how to parse a SystemT Lambda Calculus to SystemT Combinators. I decided to use plain algebraic data ...
Does anybody have any idea on how to write the basic expressions of (untyped) lambda calculus in java? i.e.
self application (λx.x x) and
function application (λx.λarg.x arg)...
I’m trying to practice beta reduction but I’m stuck on how to reduce this problem:
The outermost λx will obviously be substituted with y, but should I still proceed with ...
I want to implement a function which does beta reduction to a lambda expression where my lambda expression is of the type:
data Expr = App Expr Expr | Abs Int Expr | Var Int deriving (Show,Eq)
While going through this article about Y-combinator (which I highly recommend), I stumbled over this transformation :
((lambda (x) (x x))
(lambda (x) (f (x x)))...
this is my code for defining C0 (C0 = λs.λz.z):
c0 = s => z => z
I would like to understand in mint detail please how we managed to get from the lambda calculus expression of Y-combinator :
Y = λf.(λx.f (x x)) (λx.f (x x))
to the following implementation (in ...
In System F, the type exists a. P can be encoded as forall b. (forall a. P -> b) -> b in the sense that any System F term using an existential can be expressed in terms of this encoding ...
I'm following this blog post: http://semantic-domain.blogspot.com/2012/12/total-functional-programming-in-partial.html
It shows a small OCaml compiler program for System T (a simple total functional ...
Say I have proven some basic proposition of intuitionistic propositional logic in Isabelle/HOL:
theorem ‹(A ⟶ B) ⟶ ((B ⟶ C) ⟶ (A ⟶ C))›
assume ‹A ⟶ B›
assume ‹B ⟶ C›
I have the following definition for a function in Haskell.
> q7 :: forall a. forall b. ((a -> b) -> a) -> a
I am challenged to either create a definition for it, or state why a ...
A term t is typable if there is a context Γ and a type τ such that the judgement
" Γ ⊦ t : τ " is derivable.
How do I indicate if the expression " \ f -> \ x -> f (f (f x)) " is typable or not?
I'm trying to parse a string "A1B2C3D4" to [('A',1),('B',2),('C',3)] in Haskell.
I'm trying to use a map like this map (\[a, b] -> (a :: Char, b :: Int)) x where x is the string.
This is the ...
How to define a recursive function in the (pure) calculus of constructions? I do not see any fixpoint combinator there.
I've been doing some reading on lambda calculus and was wondering what a lambda expression for y^2 would look like.
I recently got in possession of a copy of "Essentials of Programming Languages", second edition. At page 29, the book introduces the following Scheme-flavored grammar for lambda calculus:
How does one reduce the following lambda expression (λs.λq.s q q)(λq.q)q? In the first parenthesis, is q q an input to the expression (λs.λq.s) or is it a part of the expression (s q q)?
So following this previous post:
Lambda Calculus Reduction steps
I'm still confused on some parts.
If I have something like
Notation from linked post:
(λ param . output)...
The lambda calculus has the following expressions:
e ::= Expressions
e e Function application
From this base, we can ...
I have recently been learning about λ-calculus. I understood the difference between untyped and typed λ-calculus. But, I'm not much clear about the distinction between the Hindley-Milner type system ...
Can anyone explain the difference between type-checking and type-inference problem ?
I have tried to search for the difference, but I couldn't not find any compelling source that clearly explains the ...
I've been struggling with the Lambda Calculus for quite some time now. There are plenty of resources that explain how to reduce nested lambda expressions, but less so that guide me in writing my own ...
I just learned about lambda calculus and I'm having issues trying to reduce
(λx. (λy. y x) (λz. x z)) (λy. y y)
to its normal form. I get to (λy. y (λy. y y) (λz. (λy. y y) z) then get kind of ...
So I have a little challenge.
I'm trying to program this here:
Which with lambda calculus simplifies to 12.
I have the following Scheme script:
define double (
lambda x (
Are there lambda terms M and B with M =/= B, so that M B and (M B) (M B) have the same canonical form?
Is a problem I encountered while I am still new with lambda calculus
I approached this
This question is based on my question https://cs.stackexchange.com/questions/96533/how-to-transform-lambda-function-to-multi-argument-lambda-function-and-how-to-re There are two functions and two ...
Is there a clear way to find terms in lambda-calculus? For example assume that we have a pair constructor
pair = λa. λb. λf. f a b
and we have the fst constructor
fst = λp. p (λa. λb. a)
I recently started studying Lambda Calculus as part of an assignment and I was tasked with writing a function for the logical operator >, the syntax we are using is the same as shown in this video.
In Agda, one can conveniently represent λ-terms using PHOAS:
data Term (V : Set) : Set where
var : V → Term V
abs : (V → Term V) → Term V
app : Term V → Term V → Term V
That approach has ...
const factorial = n => (iszero(n))(ONE)(multiply(n)(...
I'm pretty good at inferring the type of a lambda expression as long as it does not have any weird functions such as map, filter, foldr or any compositions in it. However, as soon as I have something ...
Suppose I have an untyped term, such as:
data Term = Lam Term | App Term Term | Var Int
-- λ succ . λ zero . succ zero
c1 = (Lam (Lam (App (Var 1) (Var 0)))
-- λ succ . λ zero . succ (succ zero)
In Morte (an implementation of calculus of constructions) this expression is well typed:
( λ(Nat : *)
-> λ(Zero : Nat)
(∀(a : *) -> (a -> a) -> a -> a)
(λ(a : ...
I have the following expression:
(((\x y -> x y (\z -> z + 1)) 5)
Besides that I have the following formula:
I (think) I know how to reduce it correctly:
((\y -> y)(\z -> z + 1) 5)
I am trying to implement basic Boolean logic in lambda calculus in Scala, but I am stuck at the beginning.
I have two types:
type λ_T[T] = T => T
type λ_λ_T[T] = λ_T[T] => T => T
Considering untyped lambda calculus.
"normal form" simply means "beta-eta-nf".
"different/same" lambda terms is compared mod alpha-conversion.
This question is just the same as "Is there a ...
I need to make F,
F x ->>β F
It says I can make F by using two kinds of combinators, but i can't.
Is there any general strategy using combinators to make some functions in lambda?
I read that lambda calculus is the language of cartesian closed categories.
As I understand it, relational languages such as minikanren or (in part) prolog would then operate on those, but also other ...