A stronger result on fractional strong colourings

Abstract

Aharoni, Berger and Ziv recently proved the fractional relaxation of the strong colouring conjecture. In this note we generalize their result as follows. Let k≥ 1 and partition the vertices of a graph G into sets V1,..., Vr, such that for 1≤ i ≤ r every vertex in Vi has at most \k, |Vi|-k \ neighbours outside Vi. Then there is a probability distribution on the stable sets of G such that a stable set drawn from this distribution hits each vertex in Vi with probability 1/|Vi|, for 1≤ i≤ r. We believe that this result will be useful as a tool in probabilistic approaches to bounding the chromatic number and fractional chromatic number.