Dyck Words, Lattice Paths, and Abelian Borders

F. Blanchet-Sadri; Kun Chen; Kenneth Hawes

doi:10.4204/EPTCS.252.9

Electronic Proceedings in Theoretical Computer Science (Aug 2017)

Dyck Words, Lattice Paths, and Abelian Borders

F. Blanchet-Sadri,
Kun Chen,
Kenneth Hawes

Affiliations

F. Blanchet-Sadri: Department of Computer Science, University of North Carolina
Kun Chen: Department of Computer Science, University of North Carolina
Kenneth Hawes: Department of Mathematics, University of Virginia

DOI: https://doi.org/10.4204/EPTCS.252.9
Journal volume & issue: Vol. 252, no. Proc. AFL 2017
pp. 56 – 70

Abstract

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We use results on Dyck words and lattice paths to derive a formula for the exact number of binary words of a given length with a given minimal abelian border length, tightening a bound on that number from Christodoulakis et al. (Discrete Applied Mathematics, 2014). We also extend to any number of distinct abelian borders a result of Rampersad et al. (Developments in Language Theory, 2013) on the exact number of binary words of a given length with no abelian borders. Furthermore, we generalize these results to partial words.

Published in Electronic Proceedings in Theoretical Computer Science

ISSN: 2075-2180 (Online)
Publisher: Open Publishing Association
Country of publisher: Australia
LCC subjects: Science: Mathematics: Instruments and machines: Electronic computers. Computer science
Website: http://eptcs.org/

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