# finding closest hamming distance

I have N < 2^n randomly generated n-bit numbers stored in a file the lookup for which is expensive. Given a number Y, I have to search for a number in the file that is at most k hamming dist. from Y. Now this calls for a C(n 1) + C(n 2) + C(n 3)...+C(n,k) worst case lookups which is not feasible in my case. I tried storing the distribution of 1's and 0's at each bit position in memory and prioritized my lookups. So, I stored probability of bit i being 0/1:

```Pr(bi=0), Pr(bi=1) for all i from 0 to n-1.
```

But it didn't help much since N is too large and have almost equal distribution of 1/0 in every bit location. Is there a way this thing can be done more efficiently. For now, you can assume n=32, N = 2^24.

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......homework? –  zengr Feb 15 '11 at 0:56
no, I hope you were more useful with your comments though. –  user352951 Feb 15 '11 at 2:23
Yeah, perhaps this is a more useful comment: You registered in stackoverflow 8 months ago, asked 6 questions, accepted only 2 answers, voted only once and never answered a question. Perhaps you should read the FAQs. –  belisarius Feb 15 '11 at 3:23
can we focus on the question but the person who asked it. And again, I wish you were useful with your comments. It's OK to not know something, accept it and move forward at times. –  user352951 Feb 15 '11 at 3:42
What's a typical value of k? –  a dabbler Feb 15 '11 at 23:30
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Google gives a solution to this problem for k=3, n=64, N=2^34 (much larger corpus, fewer bit flips, larger fingerprints) in this paper. The basic idea is that for small k, n/k is quite large, and hence you expect that nearby fingerprints should have relatively long common prefixes if you formed a few tables with permuted bits orders. I am not sure it will work for you, however, since your n/k is quite a bit smaller.

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If by "lookup", you mean searching your entire file for a specified number, and then repeating the "lookup" for each possible match, then it should be faster to just read through the whole file once, checking each entry for the hamming distance to the specified number as you go. That way you only read through the file once instead of C(n 1) + C(n 2) + C(n 3)...+C(n,k) times.

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yeah I know, but this is not what I am looking for esp. when the file is too big to be stored in memory. –  user352951 Feb 15 '11 at 2:24

You can use quantum computation for speeding up your search process and at the same time minimizing the required number of steps. I think Grover's search algorithm will be help full to you as it provides quadratic speed up to the search problem.....

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Perhaps you could store it as a graph, with links to the next closest numbers in the set, by hamming distance, then all you need to do is follow one of the links to another number to find the next closest one. Then use an index to keep track of where the numbers are by file offset, so you don't have to search the graph for Y when you need to find its nearby neighbors.

You also say you have 2^24 numbers, which according to wolfram alpha (http://www.wolframalpha.com/input/?i=2^24+*+32+bits) is only 64MB. Could you just put it all in ram to make the accesses faster? Perhaps that would happen automatically with caching on your machine?

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building the graph is a problem, perhaps you are pointing to hamming graph but there will be a lot of space wasted when you have 2^24 nodes and 2^32 - 2^24 wasted nodes. –  user352951 Feb 15 '11 at 3:57
Plus the hamming distance depends on the input value. Pre-building a data structure for a given input value is probably not practical. –  Eric J. Jun 17 '11 at 18:50