Equitable tree colouring of graphs

Abstract

Let k ∈ N and let G be a simple graph with maximum degree . A k-colouring of G is an assignment of colours from \1,2,…,k\ to the vertices of G. We call proper if adjacent vertices receive distinct colours, and equitable if the sizes of any two colour classes differ by at most one. The celebrated Hajnal--Szemer\'edi theorem states that a proper equitable k-colouring exists whenever k + 1. In this paper, we study its tree colouring variant in which each colour class induces a forest. This is closely related to the vertex arboricity which was introduced by Chartrand, Kronk, and Wall. More precisely, we prove that if n 34 and k (+2)/2, then every n-vertex graph with maximum degree at most contains an equitable tree k-colouring. This confirms a conjecture of Wu, Zhang, and Li when is even and up to an additive constant of 1 otherwise for large n. We also consider d-degenerate colouring in which each colour class induces a d-degenerate graph.