# How to find the longest continuous subsequence whose reverse is also a subsequence

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.

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I get i=2 k=3 for the first example and i=5 k=4 for the second. –  Potatoswatter Mar 19 '10 at 4:52
@Potatoswatter: No, you don't. Read the statement of the problem again. The definition of "k" is messed up. k is the length of the substring minus one, i is the one-based index. 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
@Eric: OK then. Although that works because he's guaranteed to find a substring for any non-empty input, still recommend to OP that he use normal programming conventions. –  Potatoswatter Mar 19 '10 at 5:28
–  BlueRaja - Danny Pflughoeft Mar 19 '10 at 22:03

Actually this is the longest common sub*string* problem applied to the sequence and its reverse: http://en.wikipedia.org/wiki/Longest_common_substring_problem

This is distinct from longest common sub*sequence*: http://en.wikipedia.org/wiki/Subsequence#Substring_vs._subsequence

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@Potatoswatter: The longest common substring problem compares two strings to find the common substring.... how would we apply the same principle on a single sequence and its reverse?? Please explain. –  iecut Mar 20 '10 at 2:59
@iecut: Treat the sequence as a string and its reverse as another string. Apply the algorithm to those two strings. You may iterate backwards over the sequence to obtain the second string. –  Potatoswatter Mar 20 '10 at 5:35
@Potatoswatter it is not longest common substring , as he is asking for subsequence , so we can apply LCS (just changing the comparison) to that it becomes MCS(minimum commom subsequence) as per question on string and reverse of string –  Peter Oct 28 '12 at 9:44

apply longest common substring to the string and its reverse.

`````` LCS ("abcdefgedcg", "gcdegfedcba") = "cde"
``````

EDIT: not subsequence as potatoswatter points out, not subsequence.

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–  Potatoswatter Mar 19 '10 at 4:53