# Compressing/hashing a bit vector of any length to a defined length

Given an input bit-string, I am looking for some compression/hashing algorithm to generate an output of a length of, lets say, 64 bits, with minimal false positives.

One way to achieve this is using Bloom Filters. However, as I understand, bloom filters use k hash functions, and for minimal false positive rate, the number k depends on the input bitstring length, which in my case, is not fixed.

Also, I cannot use cryptographic hash functions as they are computationally expensive.

Any hints/references ?

Thanks

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So basically, any hash function. Perhaps you could supply a bit more detail? What's known about the inputs? How many are there? What's the severity of a collision (= what do you use the hashes for)? Why can't you use cryptographic hash functions? (SHA-2 can be like 100 MiB/s on an old Intel Core 2, that's plenty fast for most purposes.) –  delnan Jan 4 '13 at 19:52
If you don't need the hashes to be cryptographically secure... why not use the low-order 64 bits, and left-fill with 0's as needed? –  Patrick87 Jan 4 '13 at 20:02
@delnan Because the hash needs to be calculated every now and then in a network, depending on the traffic, Cryptographic hash function might lead to a bottleneck. About the inputs, its only known that they are bit strings of more than >64 bits in this example. –  gaganbm Jan 4 '13 at 20:05
@Patrick87 I had thought of such a random hash function, for e.g. taking XOR of bits and resulting in 1st bit of the hash, XOR of each alternate bits and resulting in next bit of the hash and so on. But there are no mathematical background to justify the false positive rates or efficiency. –  gaganbm Jan 4 '13 at 20:08
@gaganbm Have you tried searching for it on google? The first thing I get is this ycombinator thread. One of the suggestions is MurmurHash. –  Rhymoid Jan 5 '13 at 1:27