Group vertex-arboricity of group-labelled graphs

Abstract

We introduce the vertex-arboricity of group-labelled graphs. For an abelian group , a -labelled graph is a graph whose edges are labelled by elements of . For an abelian group and A⊂eq , the (, A)-vertex-arboricity of a -labelled graph is the minimum integer k such that its vertex set can be partitioned into k parts where each part induces a subgraph having no cycle of value in A. We prove that for every positive integer ω, there is a function fω:N×N R such that if | A| ω, then every -labelled graph with (, A)-vertex-arboricity at least fω(t,d) contains a subdivision of Kt where all branching paths are of value in A and of length at least d. This extends a well-known result that every graph of sufficiently large chromatic number contains a subdivision of Kt, in various directions.