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Are there any ways to use linear-time algorithm to find the longest prefix of a string s that is a substring of the reversal of the string s?

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Is this homework? – Chris Heald Feb 20 '11 at 8:14
    
There probably is a DP solution for this. But I can't see how it would go in linear time. – aioobe Feb 20 '11 at 8:18
    
@aioobe. There is a DP solution, but I believe it's O(n^2) (really O(mn) but m=n for this problem) – Andrew Marshall Feb 20 '11 at 8:21
    
Right. That was my feeling. – aioobe Feb 20 '11 at 8:26

Apply Knuth-Morris-Pratt algorithm to search for the given string (S) in the reversed string (T). At each iteration it will find the longest prefix of S that is a suffix of T[1..i]. Then you just need to find the maximum of the lengths of these prefixes.

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will it be linear-time? – Ritesh Feb 20 '11 at 9:48
    
@Ritesh KMP is O(n+m) where n is the length of text, m is the length of substring (equal to n in this case). – adamax Feb 20 '11 at 9:51

Yes, there's an O(n) solution with a suffix tree. Suppose n is the length of string s.

  1. Computing srev, the reversal of string s, is O(n) (and actually it can be O(1), but it doesn't matter here).
  2. A suffix tree for srev can be built in O(n) time.
  3. Longest prefix of s in srev can be found in O(n) time using the suffix tree.
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Beat me by ten seconds! Great answer, +1. – templatetypedef Feb 20 '11 at 9:53
    
Could you please post a working example so that it can be handy for further reference – Deepak Feb 21 '11 at 9:16

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