# Is it possible to have a rotationally invariant identifier of a boolean matrix?

Say I have a matrix of ones and zeros, and I would like a 'identifier' for this matrix that takes the same value regardless of whether the matrix is rotated by 90, 180, or 270 degrees, i.e. a 4-to-1 mapping. Ideally, this identifier should be 1/4 the size of the matrix. Is it possible to write a function that does this mapping?

Background: I was looking at this problem on the UVa problem set. I don't exactly need such a function to solve the problem, but it seems reasonable that it would exist, and using it would make for a more elegant solution.

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+1 for the first question today that I had to read 3 times –  cdonner Nov 28 '09 at 15:25

Yes. You can take your original matrix A, and rotate it to all the possible configurations A', A'' and A'''. You can then sort these using some sorting of your choosing (just be consistent) , pick the first, and hash that using any hash function of your choosing (again, the actual hash function doesn't matter, just be consistent).

Obviously this can be optimized heavily by not actually doing the full rotation and sorting - you can do the comparisons lazily, stopping as soon as you know which rotation sorts first - but the principle is the same.

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or don't bother sorting but produce all 4 hashes and XOR them together. +1 for good idea! –  Carl Smotricz Nov 28 '09 at 15:22
Your idea would also work and it's simpler, but would probably be slower because it might be difficult to optimize this further. +1 for suggesting a different approach - sometimes simplicity is more important than performance. –  Mark Byers Nov 28 '09 at 15:29
@Carl: could you clarify how XOR-ing the 4 hashes will always produce a unique result? –  int3 Nov 28 '09 at 15:33
A hash function isn't required to produce a unique result. A good hash function produces results roughly uniformly distributed over the hash result space, even when only small changes to the input are made. XORing two uniformly distributed variables will still be uniformly distributed. –  Mark Byers Nov 28 '09 at 15:37
int3, given your requirement, your "hash" function should simply be "appending all NN bits to make a NN-bit integer". –  Mark Byers Nov 28 '09 at 15:48

You can just bit XOR all the rotations, that will be a symmetric identifier.

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