On indicated coloring of some classes of graphs

Abstract

Indicated coloring is a type of game coloring 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 obtain structural characterization of connected \P5,K4,Kite,Bull\-free graphs which contains an induced C5 and connected \P6,C5, K1,3\-free graphs that contains an induced C6. Also, we prove that \P5,K4,Kite,Bull\-free graphs that contains an induced C5 and \P6,C5,P5, K1,3\-free graphs which contains an induced C6 are k-indicated colorable for all k≥(G). In addition, we show that K[C5] is k-indicated colorable for all k≥(G) and as a consequence, we exhibit that \P2 P3, C4\-free graphs, \P5,C4\-free graphs are k-indicated colorable for all k≥(G). This partially answers one of the questions which was raised by A. Grzesik in and.