Uniformly balanced H-factors in multicoloured complete graphs

Abstract

A balanced colouring of a graph is one in which every colour appears the same number of times. Given a fixed graph H on r vertices and a balanced k-colouring of the complete graph Knrk, Hollom (2025) asked the following question: can we always find an H-factor F covering all vertices of the complete graph Knrk such that the inherited colouring of F is almost balanced? This is known to be the case for palettes of only two colours, or when H is only a single edge. We answer the above question in full, finding an H-factor which is at most Cr,k edges away from being balanced, where Cr,k depends only on r and k. In fact, we work in the more general setting wherein our palette of colours is a subset of Sd-1, and find an H-factor where the sum of the colours of all edges has bounded Euclidean norm.