# SKI transform, how to program in a functional language

I am facing the following Prolog code. The expression [X]>>Y stands for the lambda expression lambda X.Y. The code eliminates the lambda and gives a combinatory expression over S, K and I:

``````convert([X]>>Y,'I') :- X==Y, !.
convert([X]>>Y,apply('K',Y)) :- var(Y), !.
convert([X]>>([Y]>>Z),R) :-
convert([Y]>>Z,H), convert([X]>>H,R).
convert([X]>>apply(Y,Z),apply(apply('S',S),T)) :-
convert([X]>>Y,S), convert([X]>>Z,T).
convert([_]>>Y,apply('K',Y)).
``````

Here is an example how it works:

`````` ?- convert([X]>>([Y]>>apply(Y,X)),R).
R = apply(apply('S', apply(apply('S', apply('K', 'S')),
apply('K', 'I'))), apply(apply('S', apply('K', 'K')), 'I'))
``````

Suppose I would like to code the same conversion in Haskell, ML, or the like. How can I do this? Can I use the lambda expressions available in the functional programming language directly? Or do I have to regress to some meta programming facilities?

Best Regards

P.S.: The code above is not the SKI conversion that leads to very short SKI expressions. Better code is possible that checks for occurence of the bound variable in the lambda expression body.

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After posting this question I found the following interesting paper: stanford.edu/class/cs242/readings/backus.pdf . I draw the conclusion for my conversion purpose I would need a FFP (Formal Functional Language). So might the real FFP please stand up! –  Cookie Monster Jan 28 '11 at 1:02
From the answers and comments so far, I conclude that ML, Haskell do not integrate FFP seamlessly. And on the other hand Lisp, Scheme, etc.. do integrate FFP seamlessly. Can we say that when it has seamless FFP, it is a Lisp alike? Or is there a third option? –  Cookie Monster Jan 28 '11 at 1:04

Your prolog code can be translated almost verbatim into a pattern matching of ML or Haskell. Of course you'd need to define your own ADT for lambda expressions. And for the most optimal set of combinators and conversion for that set I'd recommend to refer to http://www.amazon.com/Functional-Programming-International-Computer-Science/dp/0201192497

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If you want to transform the expressions of your host language, you'd need some sort of metaprogramming capabilities. E.g., in Template Haskell you'd have an access to an AST - but expect to implement quite a complicated transform, as Haskell is much more complex than a simple untyped lambda calculus. –  SK-logic Jan 21 '11 at 12:22
@Jan Burse, the book I've mentioned talks specifically about compilation techniques for functional languages, and there is a whole chapter about the combinators-based implementation. –  SK-logic Jan 21 '11 at 12:25
There is at least one Lisp-like language wich does such a transform: sourceforge.net/projects/dslengine –  SK-logic Jan 21 '11 at 12:31
If you want to operate on an AST of your language you've got no choice but to use some kind of metaprogramming. An external preprocessor is an option - see en.wikipedia.org/wiki/Camlp4 for example. Lisp macros and Template Haskell transformers are just of another kind of metaprogramming. P.S. - what you're doing in Prolog is an example of a metaprogramming as well. –  SK-logic Jan 21 '11 at 12:41
@Jan Burse, what do you mean by doing metaprogramming "directly"? Of course you can read S-expression (say, a quoted one) and transform it, but you'd need a macro in order to pass your transformed code to a compiler. And you'd need a macro in order to transform a part of a "normal" code, not a quoted constant (the latter is pretty much equivalent to defining your own ADT, to which you opposed). –  SK-logic Jan 21 '11 at 15:45

You can directly use lamdba expressions. In Haskell:

``````i x = x
k x = \y -> x
s x y z = x z \$ y z

r = s (s (k s) (k i)) (s (k k) i)

-- r 3 (+5) -> 8
``````

(note that I didn't know of SKI up to know, this snippet is a direct conversion of the definitions on Wikipedia into Haskell; it works, but do check if it's conceptually right)

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@abesto: Thank you very much of posting the definition of S, K and I and verifying that the conversion example I gave was correct. But I would like to see a program that does for example the following: Input \x -> \y -> y x, Output: s (s (k s) (k i)) (s (k k) i) –  Cookie Monster Jan 21 '11 at 8:43
Oh. Looks like i missed the point of your question then, sorry. –  abesto Jan 21 '11 at 8:48
BTW: What is the operator \$ doing? Is this the Owl? Did you use it to save parenthesis? –  Cookie Monster Jan 21 '11 at 8:54
Yes, the only point is to use less parens. To illustrate: (a x y z = x \$ y z) and (b x y z = x (y z)) are the same functions. –  abesto Jan 21 '11 at 9:02
Also, S = (<*>) and K = pure in ((->) r). So you get SKI by including id in ((->) r). –  danportin Jan 22 '11 at 5:48