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I have seen the answers on here stating to use gperf, however, I would prefer to roll my own based on the proof that I create for the domain of strings with a fixed length of <= 200 Based on the calculations I have from wolfram I get ~7.9 x 10^374 total permutations. Therefore my line of thinking is if I have a 2048 bit hash function (3.2 x 10^616) I should be able to handle the entire universe of strings that I need to process. My question is how can I prove that the hash implementation I end up producing will be perfect given the constraint of the universe of all strings of length 200 or less?

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@interjay It being useful is more of a theoretical concept :) . So you propose that if I take each string that I have and convert it to a byte[] then apply a padding scheme to it I should have a no collision solution? If that is the case how do I prove it? – Woot4Moo May 29 '12 at 12:47

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up vote 3 down vote accepted

Strings with a length of 200 characters only have 200 * 8 = 1600 bits. If a 2048 bit hash is OK for your purpose, you could just use the string bits as a perfect hash. The identity hash function is perfect, as it maps each input to a distinct hash value (obviously, because there is no mapping).

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I chose 2048 as it was the next value above 1024 that would hold the universe. Does this have any unintended consequences? – Woot4Moo May 29 '12 at 12:49

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