On Connectivity of Comaximal Subgroup Graph

Abstract

The co-maximal subgroup graph Γ(G) of a finite group G is defined to be a graph with the set of all non-trivial proper subgroups of G as the set of vertices and two distinct vertices H and K are adjacent if and only if HK=G. The deleted co-maximal subgroup graph of G, denoted by Γ*(G), is defined as the graph obtained by removing the isolated vertices from Γ(G). In this paper, we prove that for any finite group G, Γ*(G) is connected. Furthermore, we show that Γ*(G) either contains a cycle or is a star. When Γ*(G) contains a cycle, its girth is either 3 or 4. Finally, we classify all finite groups G for which Γ*(G) is a star.