Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free, no registration required.

I am trying to learn about combinators and I am having trouble understand the example given at (Y overriding self-application). I think I am beginning to grasp the concept but I am still far from understanding.

I would like to translate the following code to Python:

     (define (U f) (f f))

     (define (fib-nr f)
       (lambda (n)
         (if (< n 2) 1 (+ ((f f) (- n 1)) ((f f) (- n 2))))))

     # Usage:   
     ((U fib-nr) 35) ;==> 14930352

I tried a 'literal' translation by writing:

U = lambda u: u(u)

def fibnr(f):
    return lambda n:  1 if (n<2) else (f (f (n-1))) + (f (f (n-2)))

But this doesnt work (I think it has to do with the order the functions are evaluated inside the lambda).

So I tried to use function composition as:

# http://code.activestate.com/recipes/52902-function-composition/
class compose:
    '''compose functions. compose(f,g,x...)(y...) = f(g(y...),x...))'''
    def __init__(self, f, g, *args, **kwargs):
        self.f = f
        self.g = g
        self.pending = args[:]
        self.kwargs = kwargs.copy()

    def __call__(self, *args, **kwargs):
        return self.f(self.g(*args, **kwargs), *self.pending, **self.kwargs)


U = lambda u: compose(u, u)

def fibnr(f):
    ff = compose(f, f)
    return lambda n:  1 if (n<2) else (ff (n-1)) + (ff (n-2))

But still didn't work, when calling my last snippet of code I get a lambda back:

>>> U(fibnr)(35)
<function <lambda> at 0x01A1B6B0>

So, is it possible to write a 'literal' translation of the given example in Python? How could I do it?

share|improve this question
add comment

1 Answer 1

up vote 3 down vote accepted

I wrote a simple translation that seems to produce correct results:

def U(f): return f(f)

def fibnr(f):
    def lam(n):
        if (n < 2): return 1
        return f(f)(n-1) + f(f)(n-2)
    return lam

Or if you really like lambdas:

def fibnr(f): return lambda n: 1 if (n < 2) else f(f)(n-1) + f(f)(n-2)

I think your initial problem was translating Lisp ((f f) x) into Python f(f(x)) instead of f(f)(x).

Good luck understanding combinators :)

share|improve this answer
    
Yes, you are totally right! I thought it had something to do with the ((f f) x) but I wasn't sure of what. I changed a bit my code to f(f)(x) and it worked. I took about 1 minute to compute U(fibnr)(35) from the python interpreter. –  JPCosta Jun 22 '10 at 22:07
add comment

Your Answer

 
discard

By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.