On multi-avoidance of right angled numbered polyomino patterns

Sergey Kitaev

On multi-avoidance of right angled numbered polyomino patterns

Research output: Contribution to journal › Article

Abstract

Recently, Kitaev, Mansour and Vella introduced numbered polyomino patterns that generalize the concept of pattern avoidance from permutations and words to numbered polyominoes. We study simultaneous avoidance of two or more right angled numbered polyomino patterns, which are 0-1 labellings of the essentially unique convex two-dimensional polyomino shape with 3 tiles. It turns out that this study gives relations to several combinatorial structures.

Original language	English
Article number	A21
Number of pages	20
Journal	Integers: Electronic Journal of Combinatorial Number Theory
Volume	4
Publication status	Published - 2004

Keywords

avoidance
numbered polyomino pattern
matrix
permutation
hypercube
spanning tree
nonattacking kings

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AB - Recently, Kitaev, Mansour and Vella introduced numbered polyomino patterns that generalize the concept of pattern avoidance from permutations and words to numbered polyominoes. We study simultaneous avoidance of two or more right angled numbered polyomino patterns, which are 0-1 labellings of the essentially unique convex two-dimensional polyomino shape with 3 tiles. It turns out that this study gives relations to several combinatorial structures.

KW - avoidance

KW - numbered polyomino pattern

KW - matrix

KW - permutation

KW - hypercube

KW - spanning tree

KW - nonattacking kings

UR - https://personal.cis.strath.ac.uk/sergey.kitaev/index_files/Papers/right_angled_patterns.ps

UR - http://www.emis.de/journals/INTEGERS/

M3 - Article

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JO - Integers: Electronic Journal of Combinatorial Number Theory

JF - Integers: Electronic Journal of Combinatorial Number Theory

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