Distinguishing number and distinguishing index of lexicographic product of two graphs

Abstract

The distinguishing number (index) D(G) (D'(G)) of a graph G is the least integer d such that G has an vertex labeling (edge labeling) with d labels that is preserved only by a trivial automorphism. The lexicographic product of two graphs G and H, G[H] can be obtained from G by substituting a copy Hu of H for every vertex u of G and then joining all vertices of Hu with all vertices of Hv if uv∈ E(G). In this paper we obtain some sharp bounds for the distinguishing number and the distinguishing index of lexicographic product of two graphs. As consequences, we prove that if G is a connected graph with a special condition on automorphism group of G[G] and D(G)> 1, then for every natural k, D(G)≤ D(Gk)≤ D(G)+k-1, where Gk=G[G[...]]. Also we prove that all lexicographic powers of G, Gk (k≥ 2) can be distinguished by at most two edge labels.