English

Semi-Transitive Orientations and Word-Representable Graphs

Combinatorics 2015-01-29 v1

Abstract

A graph G=(V,E)G=(V,E) is a \emph{word-representable graph} if there exists a word WW over the alphabet VV such that letters xx and yy alternate in WW if and only if (x,y)E(x,y)\in E for each xyx\neq y. In this paper we give an effective characterization of word-representable graphs in terms of orientations. Namely, we show that a graph is word-representable if and only if it admits a \emph{semi-transitive orientation} defined in the paper. This allows us to prove a number of results about word-representable graphs, in particular showing that the recognition problem is in NP, and that word-representable graphs include all 3-colorable graphs. We also explore bounds on the size of the word representing the graph. The representation number of GG is the minimum kk such that GG is a representable by a word, where each letter occurs kk times; such a kk exists for any word-representable graph. We show that the representation number of a word-representable graph on nn vertices is at most 2n2n, while there exist graphs for which it is n/2n/2.

Keywords

Cite

@article{arxiv.1501.07108,
  title  = {Semi-Transitive Orientations and Word-Representable Graphs},
  author = {Magnús M. Halldórsson and Sergey Kitaev and Artem Pyatkin},
  journal= {arXiv preprint arXiv:1501.07108},
  year   = {2015}
}

Comments

arXiv admin note: text overlap with arXiv:0810.0310

R2 v1 2026-06-22T08:14:52.941Z