Certain topological indices and spectral properties of SGB-graphs of finite cyclic groups

Abstract

Let L(G) be the set of all subgroups of a group G. The subgroup generating bipartite graph B(G) defined on G is a bipartite graph whose vertex set is the union of two sets G × G and L(G), and two vertices (a, b) ∈ G × G and H ∈ L(G) are adjacent if H is generated by a and b. In this paper, we realize the structures of B(G) for cyclic groups of order pq, p2q and p2q2, where p and q are primes and p ≠ q. We also deduce expressions for first and second Zagreb indices of these graphs and check the validity of Hansen-Vukicevi\'c conjecture [Hansen, P. and Vukicevi\'c, D. Comparing the Zagreb indices, Croatica Chemica Acta, 80(2), 165-168, 2007]. Expressions of certain other degree-based topological indices of these graphs are also computed. We further compute various spectra and their corresponding energies of B(G) if G is any cyclic group of order pn, pq, p2q and p2q2, where p and q are two distinct primes and n ≥ 1. We conclude the paper showing that B(G) satisfies E-LE conjecture [Gutman, I., Abreu, N. M. M., Vinagre, C. T. M., Bonifacioa, A. S. and Radenkovic, S. Relation between energy and Laplacian energy, MATCH Communications in Mathematical and in Computer Chemistry, 59, 343--354, 2008] for these groups.