# Questions tagged [s-combinator]

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

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### 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, ...
1answer
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### 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)?
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 ...
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 -&...
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 ...
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) ...
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 ...
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 ...