# Sha-1 hash fixed point

how hard is it to find x where sha1(x) = x? where x is the form of 'c999303647068a6abaca25717850c26c9cd0d89c'

i think the fact that there are sha1 collisions make this possible, but, how easy (or hard) is it to find an example?

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Upper or lowercase hex characters? ;-) –  Lucero Oct 14 '10 at 17:18
Actually, it's entirely possible that no such x exists for an arbitrary hash function (as for SHA1 specifically, I don't know). –  Victor Nicollet Oct 14 '10 at 17:20
Do you mean "How to find the values of x such that sha1(x) = 'C999303...'"? –  Nick T Oct 14 '10 at 17:20
no Nick T. I mean what string, when hashed becomes itself. –  Titi Wangsa Bin Damhore Oct 15 '10 at 14:46
or in other words, find x where sha1(sha1(x)) = sha1(x), –  Titi Wangsa Bin Damhore Oct 15 '10 at 14:49

Read Cryptanalysis of SHA-1 on Wikipedia. There's more information than you need on that article and its references combined.

Edit:

how hard is it to find x where sha1(x) = x?

Such an attack is known as a preimage attack and finding such an `x` is usually much harder than a general collision attack, i.e. finding arbitrary `x1` and `x2` such that `sha(x1) = sha(x2)`.

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The one most important reason for existence of cryptographic hash functions (of which SHA family functions are) is to make finding inputs corresponding to a given digest difficult. A cryptographic hash function producing N-bit digests is considered good if to find a matching input one must perform `2^N/2` operations in average, that is, no other way than brute-force is reliably possible.

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So you are searching for mathematical invariant for SHA1 transformation. invariant subspace problem. :-)

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SHA1 Collisions can be Found in 2^63 Operations. I would say its rather hard. You could go about brute forcing it. Get the book applied cryptography and sit down for a read. Look into the Birthday Paradox, which can be used to find collisions.

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And as a general rule, a hash collision to a perfectly secure hash should take 2^(n/2) attempts (eg: a perfectly secure SHA1 would require 2^80 attempts because it has 160 bits). See: Birthday attack –  NullUserException Oct 14 '10 at 17:22
bday paradox can be used to find arbitrary collisions within the hash domain. It does not transfer information on finding a seed for a particular hash –  Eric Oct 14 '10 at 17:32