Questions tagged [s-combinator]

Use s-combinator for questions related to creating a function which does generic partial function application

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2
votes
1answer
223 views

How to type the the simply typed lambda calculus term (S K K)

I am attempting to implement a simply typed lambda calculus type checker. When running sanity tests I tried typing (S K K) and my type checker throws this error: TypeMismatch {firstType = t -> t, ...
2
votes
1answer
56 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)?
3
votes
1answer
513 views

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 ...
18
votes
3answers
2k views

S combinator in Haskell

Can an analog of the S combinator be expressed in Haskell using only standard functions (without defining it by equation) and without using lambda (anonymous function)? I expect it to by of type (a -&...
1
vote
1answer
200 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 ...
5
votes
4answers
1k 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) ...
5
votes
1answer
552 views

S combinator in Erlang

I'm starting to learn lambda calculus and I need to implement I, S, K combinators in Erlang. Of course, S, K, I stands for: S = λxyz.xz(yz) K = λxy.x I = λx.x I have no problem understanding I=SKK ...
3
votes
2answers
2k views

To prove SKK and II are beta equivalent, lambda calculus

I am new to lambda calculus and struggling to prove the following. SKK and II are beta equivalent. where S = lambda xyz.xz(yz) K = lambda xy.x I = lambda x.x I tried to beta reduce SKK by opening ...