On 1-11-representability and multi-1-11-representability of graphs

TL;DR

This paper proves that all graphs with up to 8 vertices are 1-11-representable, extending previous results for graphs with up to 7 vertices, and explores applications in multi-1-11-representation of graphs.

Contribution

It extends the class of known 1-11-representable graphs to include all graphs with up to 8 vertices and introduces the concept of multi-1-11-representation.

Findings

All graphs on at most 8 vertices are 1-11-representable.

Extended the toolbox for studying 1-11-representable graphs.

Introduced the concept of multi-1-11-representation.

Abstract

Jeff Remmel introduced the concept of a $k$-11-representable graph in 2017. This concept was first explored by Cheon et al. in 2019, who considered it as a natural extension of word-representable graphs, which are exactly 0-11-representable graphs. A graph $G$ is $k$-11-representable if it can be represented by a word $w$ such that for any edge (resp., non-edge) $xy$ in $G$ the subsequence of $w$ formed by $x$ and $y$ contains at most $k$ (resp., at least $k+1$) pairs of consecutive equal letters. A remarkable result of Cheon at al. is that any graph is 2-11-representable, while it is still unknown whether every graph is 1-11-representable. Cheon et al. showed that the class of 1-11-representable graphs is strictly larger than that of word-representable graphs, and they introduced a useful toolbox to study 1-11-representable graphs, which was extended by additional powerful tools suggested by Futorny et al. in 2024. In this paper, we prove that all graphs on at most 8 vertices are 1-11-representable hence extending the known fact that all graphs on at most 7 vertices are 1-11-representable. Also, we discuss applications of our main result in the study of multi-1-11-representation of graphs we introduce in this paper analogously to the notion of multi-word-representation of graphs suggested by Kenkireth and Malhotra in 2023.