# U combinator on a fibonacci : how would you translate this code to python?

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?

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 :)

• 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. Jun 22 '10 at 22:07