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Subword U of given word V is double, when It's in form u=ww, for example "abab" is a double subword of "acdababx" but "cdab" is not.

I need an algorithm that checks if given subword U of word V is double. V can be preprocessed in linear time, but answer for any particular U should have constant time complexity, becouse there will be many U's for every V. U is given as an interval,for example if V = "acdababx", interval [3..6] corresponds to subword "daba".

example input and output:

V = abbacbacca

U =

  • [1 4] --> No
  • [3 8] --> Yes
  • [5 8] --> No
  • [8 9] --> Yes
  • [1 10] --> No

This is not a problem from any current contest.

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so u -> ww is guaranteed to only have w twice? – Argote Mar 30 '11 at 22:56
Or more interesting ... how to find all double substrings in a string? – Dr. belisarius Mar 30 '11 at 23:08
@Argote: by writing u=ww I meant that u is some word appended to itself. @belisarius: finding all double substrings in a string can be easily done in O(n^2) time, but its too slow here, as n can be large. – KCH Mar 30 '11 at 23:21
Yes, I understood that, what I meant is whether the times it will be repeated for it to be valid is 2 times or 2 OR MORE times. – Argote Mar 30 '11 at 23:27
up vote 1 down vote accepted

Here is one algorithm which claims to mark the endpoints of all the double words (or as it is commonly known in literature, tandem repeats) in a suffix tree of the input word (which can be constructed in O(n)) time. Of course, since I don't have full access to the article, I am not sure if it will satisfy the O(1) query time.

The paper is: Linear time algorithms for finding and representing all the tandem repeats in a string

Hope that helps.

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