Word-Representability of Shift Graphs
Abstract
A graph is word-representable if there exists a word over the alphabet such that letters and alternate in if and only if . For integers , the shift graph is the graph whose vertex set consists of all increasing -tuples with , where two vertices and are adjacent whenever for all or for all . Shift graphs are classical examples of sparse graphs having arbitrarily high chromatic number and odd girth. We further observe that shift graphs arise naturally as induced subgraphs of simplified de Bruijn graphs. Although simplified de Bruijn graphs contain non-word-representable members in general, we prove that the entire class of shift graphs is word-representable. We also introduce a natural generalization of shift graphs in which adjacency is defined by more than one shift condition, and show that these generalized shift graphs are likewise word-representable. As a consequence, we obtain an explicit family of graphs exhibiting a contrast between line graph and line digraph constructions: there exists a family of word-representable graphs whose line graphs are not word-representable when the number of vertices is at least , while their line digraphs are word-representable.
Cite
@article{arxiv.2605.02268,
title = {Word-Representability of Shift Graphs},
author = {Suchanda Roy and Ramesh Hariharasubramanian},
journal= {arXiv preprint arXiv:2605.02268},
year = {2026}
}