Intersection graph of cyclic subgroups of groups

Abstract

Let G be a group. The intersection graph of cyclic subgroups of G, denoted by Ic(G), is a graph having all the proper cyclic subgroups of G as its vertices and two distinct vertices in Ic(G) are adjacent if and only if their intersection is non-trivial. In this paper, we classify the finite groups whose intersection graph of cyclic subgroups is one of totally disconnected, complete, star, path, cycle. We show that for a given finite group G, girth( Ic (G)) ∈ \3, ∞\. Moreover, we classify all finite non-cyclic abelian groups whose intersection graph of cyclic subgroups is planar. Also for any group G, we determine the independence number, clique cover number of Ic (G) and show that Ic (G) is weakly α-perfect. Among the other results, we determine the values of n for which Ic (Zn) is regular and estimate its domination number.