# Which algorithm to use to get longest string matching in two big arrays?

The problem is easy to explain: we have two big arrays (32 bit integer values) and we have to find all common sequences above a given number of consecutive position (n).

For instance, if n=3 and arrays to compare are:

``````a = [1, 3, 5, 7, 3, 2, 7, 4, 6, 7, 2, 1, 0, 4, 6]
b = [2, 5, 7, 3, 2, 3, 4, 5, 6, 3, 2, 7, 4, 6, 0]
``````

The algoritmh should return, two arrays:

``````r0 = [5, 7, 3, 2]
r1 = [3, 2, 7, 4, 6]
``````

(or better, its relative positions to first array and the number of consecutive bytes matched).

I believe a good point to start is the Longest Common Substring Algorithm, but perhaps anybody knows an algorithm that fits better or exactly with my problem.

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I belive this belongs on Math.stackexchange –  genesis Jul 17 '11 at 12:27
This is an open research problem often studied in the context of matching/aligning DNA sequences. You might have some better luck researching how folks are doing this with DNA, or even find some available libraries. –  Mark Elliot Jul 17 '11 at 13:31
@Mark: How is this an open research problem? –  Neil G Jul 17 '11 at 14:45

I think the algorithm for finding LCS using suffix tree is a perfect fit. You build the suffix tree the same way, but in the final phase, you're not looking for the deepest node that has descendants for both strings. You're looking for all nodes with the depth of more than `n` that have descendants for both strings.

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This is the answer. –  Neil G Jul 17 '11 at 14:44

I think the algorithms on the wikipedia page you reference do almost exactly what you want. You just need to modify them to keep all answers over a certain size rather than only keeping the longest answer. For instance, the dynamic programming solution on that page could be modified as follows:

``````function LCSubstr(S[1..m], T[1..n], min_size)
L := array(1..m, 1..n)
ret := {}
for i := 1..m
for j := 1..n
if S[i] = T[j]
if i = 1 or j = 1
L[i,j] := 1
else
L[i,j] := L[i-1,j-1] + 1
if L[i,j] >= min_size
ret := ret ∪ {S[i-z+1..z]}
return
``````

As written this will include prefixes as well as longest matches. Those could be filtered out by tracking what string was found into L and removing a prefix from the return set when we discover that it has an extension.

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+1, but I'd emphasise that you really do want the O(m+n) generalised suffix tree solution instead of the O(mn) DP solution if m and n are large, as the OP claims they are. –  j_random_hacker Jul 18 '11 at 0:23