On the Diameter of a Cayley Graph of a Simple Group of Lie Type Based on a Conjugacy Class

Let G be a finite group and a set of primes. In this note we will prove Ž . two results on the local control of k G, , the number of conjugacy w x classes of -elements in G. Our results will generalize earlier ones in 8 , w x w x 9 , and 3 . Ž . Ž . In the following, we denote by F F G the poset of

In this short paper, we give a positive answer to a question of C. D. Godsil (1983, Europ. J. Combin. 4, 25 32) regarding automorphisms of cubic Cayley graphs of 2-groups: ``If Cay(G, S) is a cubic Cayley graph of a 2-group G and A=Aut Cay(G, S), does A 1 {1 imply Aut(G, S){1?'' 1998 Academic Press

We show how to deduce multiplicity one theorems for cuspidal representations of finite groups of Lie type from analogous results for p-adic groups. We then look at examples where the latter is known. One such example is the restriction of Ž . Ž . w x irreducible representations of SO n to SO n y 1 S

A lower bound is given for the harmonic mean of the growth in a finite undirected graph 1 in terms of the eigenvalues of the Laplacian of 1. For a connected graph, this bound is tight if and only if the graph is distance-regular. Bounds on the diameter of a ``sphere-regular'' graph follow. Finally,