Avoidance of boxed mesh patterns on permutations

Avgustinovich, Sergey and Kitaev, Sergey and Valyuzhenich, Alexander (2013) Avoidance of boxed mesh patterns on permutations. Discrete Applied Mathematics, 161 (1-2). pp. 43-51. ISSN 0166-218X (https://doi.org/10.1016/j.dam.2012.08.015)

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Abstract

We introduce the notion of a boxed mesh pattern and study avoidance of these patterns on permutations. We prove that the celebrated former Stanley–Wilf conjecture is not true for all but eleven boxed mesh patterns; for seven out of the eleven patterns the former conjecture is true, while we do not know the answer for the remaining four (length-four) patterns. Moreover, we prove that an analogue of a well-known theorem of Erdős and Szekeres does not hold for boxed mesh patterns of lengths larger than 2. Finally, we discuss enumeration of permutations avoiding simultaneously two or more length-three boxed mesh patterns, where we meet generalized Catalan numbers.

ORCID iDs

Avgustinovich, Sergey, Kitaev, Sergey

and Valyuzhenich, Alexander;

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Item metadata

Item type:	Article
ID code:	49882
Dates:	Date Event January 2013 Published 7 September 2012 Published Online
Subjects:	Science > Mathematics > Electronic computers. Computer science
Department:	Faculty of Science > Computer and Information Sciences
Depositing user:	Pure Administrator
Date deposited:	17 Oct 2014 10:34
Last modified:	11 Nov 2024 10:49
Related URLs:	Related item
URI:	https://strathprints.strath.ac.uk/id/eprint/49882

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