Colourings, transversals and local sparsity

Abstract

Motivated both by recently introduced forms of list colouring and by earlier work on independent transversals subject to a local sparsity condition, we use the semi-random method to prove the following result. For any function μ satisfying μ(d)=o(d) as d∞, there is a function λ satisfying λ(d)=d+o(d) as d∞ such that the following holds. For any graph H and any partition of its vertices into parts of size at least λ such that (a) for each part the average over its vertices of degree to other parts is at most d, and (b) the maximum degree from a vertex to some other part is at most μ, there is guaranteed to be a transversal of the parts that forms an independent set of H. This is a common strengthening of two results of Loh and Sudakov (2007) and Molloy and Thron (2012), each of which in turn implies an earlier result of Reed and Sudakov (2002).