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I'm working my way thorugh a book on computation (Minksy 1967) and am having a hard time with relating a recursive function to a function defined in terms of loops. Specifically he asks to find the relationship between two functions:

The Ackermann function (all code in python):

def a(n,m):
    if n==0:
        return m+1
    if m==0:
        return a(n-1,1)
    return a(n-1,a(n,m-1))

And a function that computes with n nested loops:

def p(n,m):
    for i_1 in range(m):
        for i_2 in range(m):
             for i_n in range(m):

A recursive way of writing this (with one loop) is:

def p(n,m):
     if n==0:
         return m+1
     for i in range(m):
     return m

Or a fully recursive way to write it would be:

def p(n,m):
    return P(n,m,m)
def P(n,k,m):
    if n==0:
        return m+1
    if k==1:
        return P(n-1,m,m)
    return P(n-1,m,m) 

Is there some simple way these two functions are related? I feel like I'm crawling around in a fog - any insight you could give me into how to approach these sorts of problems would be greatly appreciated. Also, is there a way to implement the fully recursive loop function without the introduction of a third parameter? Thanks.

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In the first code snippet you have two consecutive return - a typo? –  eumiro Oct 24 '10 at 20:51
@eumiro, the second return is the case when m != 0 and n != 0 –  Paul Oct 24 '10 at 20:54
@Paul, OK, thanks, I fixed the code indenting. –  eumiro Oct 24 '10 at 20:57
thanks for editing eumiro –  pat Oct 24 '10 at 21:05
"I'm crawling around in a fog" is just another word for "i'm writing a recursive function"... –  flow Oct 24 '10 at 21:30

1 Answer 1

Uhm... I don't think this will help you much, I'm kinda baffled too, but here are my thoughts.

  • Ackerman(0, m) == p(0, m)
  • Ackerman(1, m + 1) == p(1, m)

edit -- wait I think I miscopied the function. I'll give this more thought later, and if I think of something I'll update!

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