O(VE) time algorithms for the Grundy (First-Fit) chromatic number of block graphs and graphs with sufficiently large girth

Abstract

The Grundy (or First-Fit) chromatic number of a graph G=(V,E), denoted by (G) (or _ FF(G)), is the maximum number of colors used by a First-Fit (greedy) coloring of G. To determine (G) is NP-complete for various classes of graphs. Also there exists a constant c>0 such that the Grundy number is hard to approximate within the ratio c. We first obtain an O(VE) algorithm to determine the Grundy number of block graphs i.e. graphs in which every biconnected component is complete subgraph. We prove that the Grundy number of a general graph G with cut-vertices is upper bounded by the Grundy number of a block graph corresponding to G. This provides a reasonable upper bound for the Grundy number of graphs with cut-vertices. Next, define 2(G)=u∈ G~ v∈ N(u):d(v)≤ d(u) d(v). We obtain an O(VE) algorithm to determine (G) for graphs G whose girth g is at least 22(G)+1. This algorithm provides a polynomial time approximation algorithm within ratio \1, (g+1)/(22(G)+2)\ for (G) of general graphs G with girth g.