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Given a set of 100 different strings of equal length, how can you quantify the probability that a SHA1 digest collision for the strings is unlikely... ?

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clarify, how can you have 'different but equal length' strings? – KevinDTimm Dec 8 '09 at 14:13
@kevindtimm "a", "b", "c" are equal length but different strings – Joe Philllips Dec 8 '09 at 14:16
I'm assuming the strings are at least 20 bytes long. Otherwise, obviously the chances would be higher of a collision. :) – Anthony Mills Dec 8 '09 at 14:18
@anthony, why is that obvious? I don't know if that's true – Joe Philllips Dec 8 '09 at 14:19
doh, upon re-reading, it's perfectly clear. – KevinDTimm Dec 8 '09 at 15:17

3 Answers 3

up vote 99 down vote accepted

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Are the 160 bit hash values generated by SHA-1 large enough to ensure the fingerprint of every block is unique? Assuming random hash values with a uniform distribution, a collection of n different data blocks and a hash function that generates b bits, the probability p that there will be one or more collisions is bounded by the number of pairs of blocks multiplied by the probability that a given pair will collide.

(source :

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what a beautiful answer, an image, a quote and a reference: nice! – Sander Versluys Dec 8 '09 at 14:20
In conclusion, the likelihood of a collision is in the order of 10^-45. That is very, very unlikely. – Paul Lammertsma Dec 8 '09 at 14:41
Hah! What Euler's answers would look like if he posted on SO. – Purrell May 14 '12 at 23:38
@SanderVersluys, except after some time, the image is taken away from the website and the reference is broken! – Shahbaz Aug 2 '12 at 12:21
But SHA-1 is not uniform distribution, it could be bigger than this upper bound. I doubt that this equation is not correct. AS least the EQUAL. – Kamel Apr 11 at 2:12

Well, it would be 1 * ((2^160 - 1) / 2^160) * ((2^160 - 2) / 2^160) * ... * ((2^160 - 99) / 2^160).

It's pretty unlikely. You'd have to have many more strings for it to be a remote possibility.

Take a look at the table on this page on Wikipedia; just interpolate between the rows for 128 bits and 256 bits.

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That's Birthday Problem - the article provides nice approximations that make it quite easy to estimate the probability. Actual probability will be very very very low - see this question for an example.

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