The Locating Rainbow Connection Number of the Edge Corona of a Graph with a Complete Graph

Abstract

A graph has a locating rainbow coloring if every pair of its vertices can be connected by a path passing through internal vertices with distinct colors and every vertex generates a unique rainbow code. The minimum number of colors needed for a graph to have a locating rainbow coloring is referred to as the locating rainbow connection number of a graph. Let G and H be two connected, simple, and undirected graphs on disjoint sets of |V(G)| and |V(H)| vertices, |E(G)| and |E(G)| edges, respectively. For j∈\1,2,...,|E(Gm)|\, the edge corona of Gm and Hn, denoted as Gm Hn, is constructed by using a single copy of Gm and E(Gm) copies of Hn, and then connecting the two end vertices of the j-th edge of Gm to every vertex in the j-th copy of Hn. In this paper, we determine the upper and lower bounds of the locating rainbow connection number for the class of graphs resulting from the edge corona of a graph with a complete graph. Furthermore, we demonstrate that these upper and lower bounds are tight.

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