# 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 transformation on paper (like presented here: To prove SKK and II are beta equivalent, lambda calculus) but it seems that I don't understand it when it comes to functional languages and high-order functions...

I managed to do I and K (lets say in module `test`):

``````i(X) -> X.
k(X) -> fun(Y) -> X end.
``````

Also I know how to run K x (K x) (SKK x = K x (K x))

``````kxk(X) -> (k(X))(k(X)).
``````

But I can't get it around to write S combinator. I tried:

``````s(X) -> fun (Y) -> fun(Z) -> X,Z (Y,Z) end end.
``````

But still, I'm not able to transform SKK x into x

I try to run it like this:

``````skkx(X) ->  s((k((k(X))))).
``````

Any help would be appreciated, as I'm completely lost.

-
Indeed, your problem is purely notational. If you understand how beta-reduction works, then surely you understand the idea. The rest is just notation. – I GIVE CRAP ANSWERS Oct 17 '11 at 11:08

From the Erlang shell:

``````1> I = fun (X) -> X end.
#Fun<erl_eval.6.80247286>
2> K = fun (X) -> fun (Y) -> X end end.
#Fun<erl_eval.6.80247286>
3> S = fun (X) -> fun (Y) -> fun (Z) -> (X(Z))(Y(Z)) end end end.
#Fun<erl_eval.6.80247286>
4> ((S(K))(K))(42).
42
``````

Or as functions in a module:

``````i(X) -> X.
k(X) -> fun(Y) -> X end.
s(X) -> fun (Y) -> fun (Z) -> (X(Z))(Y(Z)) end end.
``````
-
ok, I still seems to have some problems :/ In my module I have: i(X) -> X. k(X) -> fun(Y) -> X end. s(X) -> fun (Y) -> fun (Z) -> (X(Z))(Y(Z)) end end. skk(X) ->((s(k))(k))(X). When I run (tppr is module name): `tppr:skk(x).` I get: `** exception error: bad function k in function tppr:'-s/1-fun-0-'/3` What am I missing? – Krodak Oct 17 '11 at 12:15
In your definition of skk(X) ->((s(k))(k))(X) you have written lowercase k - this is the atom 'k', not the function k/1. If you instead write skk(X) ->((s(fun k/1))(fun k/1))(X), it should work. – RichardC Oct 17 '11 at 13:36
Thank You, yes, that was the case, quite silly one, I must admit ;) – Krodak Oct 17 '11 at 19:53