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We have a matrix with elements in the field of integers modulo 2 (F_2). We are looking for algorithm that multiply n x n matrix over F_2 in just O(n^2.81/(log n)^0.4)

How it is possible?

I know, that Strassen's algorithm gives O(n^2.81), but how can we get this factor of (log n)^0.4?

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Do you have a reference saying that this is possible? A link to a paper would help. –  tskuzzy May 30 '12 at 18:12
    
You might want to look into the M4RI algorithm: m4ri.sagemath.org It doesn't achieve the running time you're looking for, but contains some worthwhile techniques. –  tskuzzy May 30 '12 at 18:19
    
No, it's my exercise for Algorithms and Data Structures. I get hint to use four russian algorithm and also decimal encoding for this logical matrix, but still don't know how we get (log n^0.4) –  user1426653 May 30 '12 at 18:19

1 Answer 1

You can do following (I'm not sure if it provides required complexity, but it should help):

Take each possible matrix with dimensions sqrt(log n) X sqrt(log n). There are n such matrices (2^(sqrt(log n) sqrt(log n)) = 2^(log n) = n).

Precompute multiplication result for these matrices. This gives you table with dimensions NxN = O(N^2).

Then in recursion phase of Strassen algorithm, if required matrices for multiplication are small enough you can use precomputed values in this table.

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