On indicated coloring of lexicographic product of graphs

Abstract

Indicated coloring is a graph coloring game in which two players collectively color the vertices of a graph in the following way. In each round the first player (Ann) selects a vertex, and then the second player (Ben) colors it properly, using a fixed set of colors. The goal of Ann is to achieve a proper coloring of the whole graph, while Ben is trying to prevent the realization of this project. The smallest number of colors necessary for Ann to win the game on a graph G (regardless of Ben's strategy) is called the indicated chromatic number of G, denoted by i(G). In this paper, we have shown that for any graphs G and H, G[H] is k-indicated colorable for all k≥col(G)col(H). Also, we have shown that for any graph G and for some classes of graphs H with (H)=i(H)=, G[H] is k-indicated colorable if and only if G[K] is k-indicated colorable. As a consequence of this result we have shown that for some particular families of graphs G and H, G[H] is k-indicated colorable for every k≥ (G[H]). This serves as a partial answer to one of the questions raised by A. Grzesik in and. In addition, if G is a Bipartite graph or a \P5,K3\-free graph (or) a \P5,Paw\-free graph and if H is from the same families of graphs, then we have shown that i(G[H])=(G[H]).