Signless Laplacian energies of non-commuting graphs of finite groups and related results

Abstract

The non-commuting graph of a non-abelian group G with center Z(G) is a simple undirected graph whose vertex set is G Z(G) and two vertices x, y are adjacent if xy yx. In this study, we compute Signless Laplacian spectrum and Signless Laplacian energy of non-commuting graphs of finite groups. We obtain several conditions such that the non-commuting graph of G is Q-integral and observe relations between energy, Signless Laplacian energy and Laplacian energy. In addition, we look into the energetic hyper- and hypo-properties of non-commuting graphs of finite groups. We also assess whether the same graphs are Q-hyperenergetic and L-hyperenergetic.