A Note on Easy and Efficient Computation of Full Abelian Periods of a Word

October 02, 2015 Β· Declared Dead Β· πŸ› Discrete Applied Mathematics

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Authors Gabriele Fici, Thierry Lecroq, Arnaud Lefebvre, Γ‰lise Prieur-Gaston, William F. Smyth arXiv ID 1510.00634 Category cs.DS: Data Structures & Algorithms Cross-listed cs.DM, cs.FL Citations 5 Venue Discrete Applied Mathematics Last Checked 4 months ago
Abstract
Constantinescu and Ilie (Bulletin of the EATCS 89, 167-170, 2006) introduced the idea of an Abelian period with head and tail of a finite word. An Abelian period is called full if both the head and the tail are empty. We present a simple and easy-to-implement $O(n\log\log n)$-time algorithm for computing all the full Abelian periods of a word of length $n$ over a constant-size alphabet. Experiments show that our algorithm significantly outperforms the $O(n)$ algorithm proposed by Kociumaka et al. (Proc. of STACS, 245-256, 2013) for the same problem.
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