Common neighborhood (signless) Laplacian spectrum and energy of CCC-graph

Abstract

In this paper, we consider commuting conjugacy class graph (abbreviated as CCC-graph) of a finite group G which is a graph with vertex set \xG : x ∈ G Z(G)\ (where xG denotes the conjugacy class containing x) and two distinct vertices xG and yG are joined by an edge if there exist some elements x'∈ xG and y'∈ yG such that they commute. We compute common neighborhood (signless) Laplacian spectrum and energy of CCC-graph of finite non-abelian groups whose central quotient is isomorphic to either Zp × Zp (where p is any prime) or the dihedral group D2n (n ≥ 3); and determine whether CCC-graphs of these groups are common neighborhood (signless) Laplacian hyperenergetic/borderenergetic. As a consequence, we characterize certain finite non-abelian groups viz. D2n, T4n, U6n, U(n, m), SD8n and V8n such that their CCC-graphs are common neighborhood (signless) Laplacian hyperenergetic/borderenergetic.