A note on the Thue chromatic number of lexicographic products of graphs

TL;DR

This paper establishes an upper bound for the Thue chromatic number of lexicographic graph products and determines exact values for specific cases involving complete multipartite graphs.

Contribution

It provides a general upper bound for the Thue chromatic number of lexicographic graph products and calculates exact values for certain graph classes.

Findings

Derived a general upper bound for $ ext{π}(G owtie H)$

Calculated exact Thue chromatic numbers for lexicographic products with complete multipartite graphs

Extended understanding of non-repetitive colourings in complex graph structures

Abstract

A sequence is called non-repetitive if no of its subsequences forms a repetition (a sequence $r_1,r_2,\dots,r_{2n}$ such that $r_i=r_{n+i}$ for all $1\leq i \leq n$). Let $G$ be a graph whose vertices are coloured. A colouring $\varphi$ of the graph $G$ is non-repetitive if the sequence of colours on every path in $G$ is non-repetitive. The Thue chromatic number, denoted by $\pi (G)$, is the minimum number of colours of a non-repetitive colouring of $G$. In this short note we present a general upper bound for the Thue chromatic number for the lexicographic product $G\circ H$ of graphs $G$ and $H$ with respect to some properties of the factors. This upper bound is then used to derive the exact values for $\pi(G\circ H)$ when $G$ is a complete multipartite graph and $H$ is an arbitrary graph.