Extending Morgan and Parker's results about commuting graphs

Abstract

Morgan and Parker have proved that if G is a group satisfying the condition that Z(G) = 1, then the connected components of the commuting graph of G have diameter at most 10. Parker has proved that if in addition G is solvable, then the commuting graph of G is disconnected if and only if G is a Frobenius group or a 2-Frobenius group, and if the commuting graph of G is connected, then its diameter is at most 8. We prove that the hypothesis Z (G) = 1 in these results can be replaced with G' Z(G) = 1. We also prove that if G is solvable and G/Z(G) is either a Frobenius group or a 2-Frobenius group, then the commuting graph of G is disconnected.