An asymptotic bound for the strong chromatic number

Abstract

The strong chromatic number s(G) of a graph G on n vertices is the least number r with the following property: after adding r n/r - n isolated vertices to G and taking the union with any collection of spanning disjoint copies of Kr in the same vertex set, the resulting graph has a proper vertex-colouring with r colours. We show that for every c > 0 and every graph G on n vertices with (G) cn, s(G) ≤ (2 + o(1)) (G), which is asymptotically best possible.