Multiplicative topological indices: Analytical properties and application to random networks

Abstract

We make use of multiplicative degree-based topological indices X(G) to perform a detailed analytical and statistical study of random networks G=(V(G),E(G)). We consider two classes of indices: X(G) = Πu ∈ V(G) FV(du) and X(G) = Πuv ∈ E(G) FE(du,dv), where uv denotes the edge of G connecting the vertices u and v, du is the degree of the vertex u, and FV(x) and FE(x,y) are functions of the vertex degrees. Specifically, we find analytical inequalities involving these multiplicative indices. Also, we apply X(G) on three models of random networks: Erd\"os-R\'enyi networks, random geometric graphs, and bipartite random networks. We show that < X(G) >, normalized to the order of the network, scale with the corresponding average degree; here < · > denotes the average over an ensemble of random networks.