Conflict-Free Coloring of Star-Free Graphs on Open Neighborhoods

Abstract

Given a graph, the conflict-free coloring problem on open neighborhoods (CFON) asks to color the vertices of the graph so that all the vertices have a uniquely colored vertex in its open neighborhood. The smallest number of colors required for such a coloring is called the conflict-free chromatic number and denoted ON(G). In this note, we study this problem on Sk-free graphs where Sk is a star on k+1 vertices. When G is Sk-free, we show that ON(G) = O(k· 2+ε), for any ε > 0, where denotes the maximum degree of G. Further, we show existence of claw-free (S3-free) graphs that require ( ) colors.