Combinatorics of cyclic shifts in plactic, hypoplactic, sylvester, Baxter, and related monoids

The cyclic shift graph of a monoid is the graph whose vertices are elements of the monoid and whose edges link elements that differ by a cyclic shift. This paper examines the cyclic shift graphs of ‘plactic-like’ monoids, whose elements can be viewed as combinatorial objects of some type: aside from...

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Bibliographic Details
Published in:Journal of Algebra
Main Authors: Cain, Alan J., Malheiro, António
Other Authors: CMA - Centro de Matemática e Aplicações, DM - Departamento de Matemática
Format: Article in Journal/Newspaper
Language:English
Published: 2019
Subjects:
Binary search tree
Conjugacy
Cyclage
Cyclic shift
Hypoplactic monoid
Plactic monoid
Quasi-ribbon tableau
Sylvester monoid
Algebra and Number Theory
Baxter
taiga
Online Access:http://www.scopus.com/inward/record.url?scp=85068467706&partnerID=8YFLogxK
https://doi.org/10.1016/j.jalgebra.2019.06.025
Description
Summary:The cyclic shift graph of a monoid is the graph whose vertices are elements of the monoid and whose edges link elements that differ by a cyclic shift. This paper examines the cyclic shift graphs of ‘plactic-like’ monoids, whose elements can be viewed as combinatorial objects of some type: aside from the plactic monoid itself (the monoid of Young tableaux), examples include the hypoplactic monoid (quasi-ribbon tableaux), the sylvester monoid (binary search trees), the stalactic monoid (stalactic tableaux), the taiga monoid (binary search trees with multiplicities), and the Baxter monoid (pairs of twin binary search trees). It was already known that for many of these monoids, connected components of the cyclic shift graph consist of elements that have the same evaluation (that is, contain the same number of each generating symbol). This paper focuses on the maximum diameter of a connected component of the cyclic shift graph of these monoids in the rank-n case. For the hypoplactic monoid, this is n−1; for the sylvester and taiga monoids, at least n−1 and at most n; for the stalactic monoid, 3 (except for ranks 1 and 2, when it is respectively 0 and 1); for the plactic monoid, at least n−1 and at most 2n−3. The current state of knowledge, including new and previously-known results, is summarized in a table. authorsversion published

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