b-continuity and Partial Grundy Coloring of graphs with large girth

Abstract

A b-coloring of a graph is a proper coloring such that each color class has at least one vertex which is adjacent to each other color class. The b-spectrum of G is the set Sb(G) of integers k such that G has a b-coloring with k colors and b(G)= Sb(G) is the b-chromatic number of G. A graph is b-continous if Sb(G)=[(G),b(G)] Z. An infinite number of graphs that are not b-continuous is known. It is also known that graphs with girth at least 10 are b-continuous. A partial Grundy coloring is a proper coloring f:V(G)→ \1,…,k\ such that each color class i contains some vertex u that is adjacent to every color class j such that j<i. The partial Grundy number of G is the maximum value ∂(G) for which G has a partial Grundy coloring. In this work, we prove that graphs with girth at least 8 are b-continuous, and that the b-spectrum of a graph G with girth at least 7 contains the integers between 2(G) and b(G). We also prove that ∂(G) equals a known upper bound when G is a graph with girth at least 7. These results generalize previous ones by Linhares-Sales and Silva (2017), and by Shi et al.(2005).