On bounding the difference between the maximum degree and the chromatic number by a constant

Abstract

We provide a finite forbidden induced subgraph characterization for the graph class k, for all k ∈ N0, which is defined as follows. A graph is in k if for any induced subgraph, ≤ -1 + k holds, where is the maximum degree and is the chromatic number of the subgraph. We compare these results with those given in [O. Schaudt, V. Weil, On bounding the difference between the maximum degree and the clique number, Graphs and Combinatorics 31(5), 1689-1702 (2015). DOI: 10.1007/s00373-014-1468-3], where we studied the graph class k, for k ∈ N0, whose graphs are such that for any induced subgraph, ≤ ω -1 + k holds, where ω denotes the clique number of a graph. In particular, we give a characterization in terms of k and k of those graphs where the neighborhood of every vertex is perfect.