Quotient graphs for power graphs

Abstract

In a previous paper of the first author a procedure was developed for counting the components of a graph through the knowledge of the components of its quotient graphs. We apply here that procedure to the proper power graph P0(G) of a finite group G, finding a formula for the number c(P0(G)) of its components which is particularly illuminative when G≤ Sn is a fusion controlled permutation group. We make use of the proper quotient power graph P0(G), the proper order graph O0(G) and the proper type graph T0(G). We show that all those graphs are quotient of P0(G) and demonstrate a strong link between them dealing with G=Sn. We find simultaneously c(P0(Sn)) as well as the number of components of P0(Sn), O0(Sn) and T0(Sn).