Existence of μ-representation of graphs

Kitaev, Sergey (2017) Existence of μ-representation of graphs. Journal of Graph Theory, 85 (3). pp. 661-668. ISSN 1097-0118 (https://doi.org/10.1002/jgt.22097)

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Abstract

Recently, Jones et al. introduced the study of μ-representable graphs, where μ is a word over { 1,2} containing at least one 1. The notion of a μ-representable graph is a far-reaching generalization of the notion of a word-representable graph studied in the literature in a series of papers. Jones et al. have shown that any graph is 11⋯1-representable assuming that the number of 1s is at least three, while the class of 12-rerpesentable graphs is properly contained in the class of comparability graphs, which, in turn, is properly contained in the class of word-representable graphs corresponding to 11-representable graphs. Further studies in this direction were conducted by Nabawanda, who has shown, in particular, that the class of 112-representable graphs is not included in the class of word-representable graphs. Jones et al. raised a question on classification of μ-representable graphs at least for small values of μ. In this paper we show that if μ is of length at least 3 then any graph is μ-representable. This rather unexpected result shows that from existence of representation point of view there are only two interesting non-equivalent cases in the theory of μ-representable graphs, namely, those of μ=11 and μ=12.

ORCID iDs

Kitaev, Sergey ORCID: https://orcid.org/0000-0003-3324-1647

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• Item metadata

  Item type:	Article
  ID code:	57302
  Dates:	Date Event 31 July 2017 Published 28 September 2016 Published Online 25 May 2016 Accepted
  Notes:	This is the accepted version of the following article: Kitaev, S. (2016). Existence of μ-representation of graphs. Journal of Graph Theory. which has been published in final form at http://onlinelibrary.wiley.com/journal/10.1002/(ISSN)1097-0118 . This article may be used for non-commercial purposes in accordance with the Wiley Self-Archiving Policy [http://olabout.wiley.com/WileyCDA/Section/id-828039.html].
  Subjects:	Science > Mathematics
  Department:	Faculty of Science > Computer and Information Sciences
  Depositing user:	Pure Administrator
  Date deposited:	05 Aug 2016 13:42
  Last modified:	11 Nov 2024 17:48
  Related URLs:	Journal or Publication
  URI:	https://strathprints.strath.ac.uk/id/eprint/57302