Non-solvable graphs of groups

Abstract

Let G be a group and Sol(G)=\x ∈ G : x,y is solvable for all y ∈ G\. We associate a graph NSG (called the non-solvable graph of G) with G whose vertex set is G Sol(G) and two distinct vertices are adjacent if they generate a non-solvable subgroup. In this paper we study many properties of NSG. In particular, we obtain results on vertex degree, cardinality of vertex degree set, graph realization, domination number, vertex connectivity, independence number and clique number of NSG. We also consider two groups G and H having isomorphic non-solvable graphs and derive some properties of G and H. Finally, we conclude this paper by showing that NSG is neither planar, toroidal, double-toroidal, triple-toroidal nor projective.