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I have found some algorithms online to generate derangements in Python but they're all exponential in complexity and as a result I can't get them to converge with a set of 26 elements (the alphabet)!

So I'm trying to find a way to improve the following code (source here):

def derangement(vs):
    l = [None for x in vs]
    sol = set()
    sol.add(tuple(l))
    for v in vs:
        sol1 = set()
        for s in sol:
            for (i, v1) in enumerate(s):
                if not v1 and v != vs[i]:
                    s1 = list(s)
                    s1[i] = v
                    sol1.add(tuple(s1))
        sol = sol1
    return list(sol)

If anyone is curious this is for a bruteforce substitution cipher solver. I'm trying to see how long it takes to bruteforce a cipher!

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The number of permutations grows exponentially (or, more precisely, factorially). Every algorithm generating all permutations of n objects is Ω(n!). –  Sven Marnach Jun 15 '11 at 2:17
    
have you checked itertools module? –  JBernardo Jun 15 '11 at 2:18
3  
yeah but you can make a derangement out of permutations with a single line of code –  JBernardo Jun 15 '11 at 2:26
1  
Sven, you might have assumed that my environment would have protected me but that actually crashed my computer. –  2rs2ts Jun 15 '11 at 2:34
1  
@user: Really sorry. It didn't crash mine (I also tried) and it definitely shouldn't crash any computer. –  Sven Marnach Jun 15 '11 at 2:47

2 Answers 2

up vote 5 down vote accepted

As permutation algorithms are Ω(n!) nothing will make your code converge. This may be faster, but that means nothing for things of that complexity:

import itertools
def derangement(x):
    p = itertools.permutations(x)
    return (i for i in p if not any(i[k] == x[k] for k in range(len(x))))

It's a lazy iterator. If you need all values (I doubt you need) just list() it

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I did not know it was a lazy iterator so thanks for the heads up and the optimization. I guess with a general purpose computer bruteforcing a substitution cipher is a shot in the dark! –  2rs2ts Jun 15 '11 at 2:42

Not necessarily, it depends on the cypher you're using. If you're using a Caesar cypher which I'm sure you aren't, you only have to try all 26! Permutations and then find the one*('s) with real words but I'm pretty sure you mean for a vigenere cypher in which case you take all of the first set of permutations and you lay those in rows of a similar faction and find those permutations and then cross check for dictionary words and then you'd probably get a very long list of possible messages and you'd have to sort through those for one that made sense.

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those are shift ciphers, the substitution cipher is a cipher where the key is a mapping of the alphabet to a permutation of the alphabet, i.e. A = C, B = Q, C = T ... –  2rs2ts Feb 8 '12 at 17:49

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