A characterization of b-chromatic and partial Grundy numbers by induced subgraphs

Abstract

Gy\'arf\'as et al. and Zaker have proven that the Grundy number of a graph G satisfies (G) t if and only if G contains an induced subgraph called a t-atom.The family of t-atoms has bounded order and contains a finite number of graphs.In this article, we introduce equivalents of t-atoms for b-coloring and partial Grundy coloring.This concept is used to prove that determining if (G) t and ∂(G) t (under conditions for the b-coloring), for a graph G, is in XP with parameter t.We illustrate the utility of the concept of t-atoms by giving results on b-critical vertices and edges, on b-perfect graphs and on graphs of girth at least 7.