On the number of MUSs crossing a position
Abstract
A string w is said to be a minimal unique substring (MUS) of a string T if w occurs exactly once in T, and any proper substring of w occurs at least twice in T. It is known that the number of MUSs in a string T of length n is at most n, and that the set MUS(T) of all MUSs in T can be computed in O(n) time [Ilie and Smyth, 2011]. Let MUS(T,i) denote the set of MUSs that contain a position i in a string T. In this short paper, we present matching (n) upper and lower bounds for the number |MUS(T,i)| of MUSs containing a position i in a string T of length n.
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