Genus of commuting conjugacy class graph of groups

Abstract

For a non-abelian group G, its commuting conjugacy class graph CCC(G) is a simple undirected graph whose vertex set is the set of conjugacy classes of the non-central elements of G and two distinct vertices xG and yG are adjacent if there exists some elements x' ∈ xG and y' ∈ yG such that x'y' = y'x'. In this paper we compute the genus of CCC(G) for six well-known classes of non-abelian two-generated groups (viz. D2n, SD8n, Q4m, V8n, U(n, m) and G(p, m, n)) and determine whether CCC(G) for these groups are planar, toroidal, double-toroidal or triple-toroidal.