On Generalized Edge Corona Product of Graphs

Abstract

Let G be a simple graph with m edges and Hi, 1≤ i ≤ m be simple graphs too. The generalized edge corona product of graphs G and H1, ..., Hm, denoted by G (H1, ..., Hm), is obtained by taking one copy of graphs G, H1, ..., Hm and joining two end vertices of i-th edge of G to every vertex of Hi, 1≤ i ≤ m. In this paper, some results regarding the k-distance chromatic number of Generalized edge corona product of graphs are presented. Also, as a consequence of our results, we compute this invariant for the graphs Kn (H1, ..., Hm), T (H1, ..., Hm) and Km,n (H1, ..., Hm). Moreover, the domination set, domination number and the independence number of any connected graph G and arbitrary graphs Hi, 1≤ i ≤ |E(G)|, are evaluated under generalized edge corona operation.