k-geometric graphs

Abstract

A finite, simple and undirected graph G = (V, E) with p vertices and q edges is said to be a k-geometric mean graph for a positive integer k if there is an injection :V(G) \k,k+1,…,k+q\ such that, when each edge uv∈ E(G) is assigned the label (u)(v) or (u)(v), the resulting edge label set is \k,k+1,...,k+q-1\ and is called a k-geometric mean labeling of G. The special case k=1, a 1-geometric mean labeling is called a geometric mean labeling, and a 1-geometric mean graph is called a geometric mean graph. In this paper, we present new classes of geometric mean graphs. Then we introduce k-geometric mean labeling and prove some classes of graphs are k-geometric mean. We also study some classes of finite join of graphs that admit geometric mean labeling.