Word-representability of Toeplitz graphs
Abstract
Distinct letters and alternate in a word if after deleting in all letters but the copies of and we either obtain a word of the form (of even or odd length) or a word of the form (of even or odd length). A graph is word-representable if there exists a word over the alphabet such that letters and alternate in if and only if is an edge in . In this paper we initiate the study of word-representable Toeplitz graphs, which are Riordan graphs of the Appell type. We prove that several general classes of Toeplitz graphs are word-representable, and we also provide a way to construct non-word-representable Toeplitz graphs. Our work not only merges the theories of Riordan matrices and word-representable graphs via the notion of a Riordan graph, but also it provides the first systematic study of word-representability of graphs defined via patterns in adjacency matrices. Moreover, our paper introduces the notion of an infinite word-representable Riordan graph and gives several general examples of such graphs. It is the first time in the literature when the word-representability of infinite graphs is discussed.
Cite
@article{arxiv.1907.09152,
title = {Word-representability of Toeplitz graphs},
author = {Gi-Sang Cheon and Jinha Kim and Minki Kim and Sergey Kitaev},
journal= {arXiv preprint arXiv:1907.09152},
year = {2019}
}
Comments
To appear in Discrete Applied Mathematics