# solving string alignment in O(mn)

I need to solve the follow problem withing O(nm). n = |T| m = |P| where T,P two strings f is a scoring function.

the algorithm should return a substring T' of T such that score(P,T') value is the maximum.

score(A,B) is the max val for alignment A and B according f.

I know I can get it from DIST matrix which is a Monge matrix if f is discrete (meaning the diagonals of the matrix has weights not larger than C which is a constant, and the horizontal and vertical edges is 0 or some other constant), but in this case the f is a general function from (sigma * {-})x(sigma * {-}) to R (where '-' is a gap).

any ideas?

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This smells like homework. Is it? –  Jasper Apr 23 '12 at 14:58
How does brute force sound to you? –  Boris Strandjev Apr 23 '12 at 15:00
I need to present some string algorithms and I came across waterman's algorithm, Hirschberg's algorithm and some others. but everybody succeed to solve problems like this one in O(mn) with a lot of assumption on the scoring function. I simply want to present a better one if it exists. –  R.G Apr 23 '12 at 15:04
bruth force is not good because it would run in O((n^2) * m) –  R.G Apr 23 '12 at 15:05
Isn't Needleman-Wunsh O(mn)? –  soulcheck Apr 23 '12 at 15:23