Characterization of commuting graphs of finite groups having small genus

Abstract

In this paper we first show that among all double-toroidal and triple-toroidal finite graphs only K8 9K1, K8 5K2, K8 3K4, K8 9K3, K8 9(K1 3K2), 3K6 and 3K6 4K4 6K2 can be realized as commuting graphs of finite groups. As consequences of our results we also show that for any finite non-abelian group G if the commuting graph of G (denoted by c(G)) is double-toroidal or triple-toroidal then c(G) and its complement satisfy Hansen-Vukicevi\'c Conjecture and E-LE conjecture. In the process we find a non-complete graph, namely the non-commuting graph of the group (Z3 × Z3) Q8, that is hyperenergetic. This gives a new counter example to a conjecture of Gutman regarding hyperenergetic graphs.