@article{Article_10,

title = {On The Conjugacy Class Graphs of Some Dicyclic Groups},

journal = {Communications in Combinatorics, Cryptography & Computer Science},

volume = {2021},

issue = {1},

issn = { 2783-5456 },

year = {2021},

url = {http://cccs.sgh.ac.ir/Articles/2021/issue 1/1-10-on_the_conjugacy_class_graphs_of_some_dicyclic_groups-1637955007.pdf},

author = {Zeinab Foruzanfar and Mehdi Rezaei},

keywords = {Dicyclic group, Conjugacy class, Clique number, Girth.},

abstract = {Let G be a dicyclic group and 􀀀 (G) be the attached graph related to its conjugacy classes, which is defined as: the vertices of 􀀀 (G) are represented by the non-central conjugacy classes of G and two distinct vertices xG and yG are connected with an edge if (o(x), o(y)) > 1. In this paper, we calculate the clique number and the girth of 􀀀 (G) for dicyclic groups of orders 4p, 8p, 4p2, 4pq and 2m.}

};