On the distinguishing chromatic number in hereditary graph classes
Abstract
The distinguishing chromatic number of a graph G, denoted D(G), is the minimum number of colours in a proper vertex colouring of G that is preserved by the identity automorphism only. Collins and Trenk proved that D(G) 2(G) for any connected graph G, and the equality holds for complete balanced bipartite graphs Kp,p and for C6. In this paper, we show that the upper bound on D(G) can be substantially reduced if we forbid some small graphs as induced subgraphs of G, that is, we study the distinguishing chromatic number in some hereditary graph classes.
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