Suppose I have a sequence x1,x2,x3.....xn, and I want to find the longest continuous subsequence xi,xi+1,xi+2......xi+k, whose reverse is also a subsequence of the given sequence. And if there are multiple such subsequences, then I also have to find the smallest i.

ex:- consider the sequences:

**abcdefgedcg**
here i=3 and k=2

**aabcdddd**
here i=5, k=3

I tried looking at the original longest common subsequence problem, but that is used to compare the two sequences to find the longest common subsequence.... but here is only one sequence from which we have to find the subsequences. Please let me know what is the best way to approach this problem, to find the optimal solution.

minus one, i is theone-basedindex. You are assuming that k is the length of the substring and i is the distance from the beginning, but that's not how they were defined. – Eric Lippert Mar 19 '10 at 5:21