Conjugacy Classes of Elements in the Borovik Group

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

Let W be a finite Coxeter group and let F be an automorphism of W that leaves the set of generators of W invariant. We establish certain properties of elements of minimal length in the F-conjugacy classes of W that allow us to define character tables for the corresponding twisted Iwahori᎐Hecke algeb

The distribution of descents in a fixed conjugacy class of S n is studied and it is shown that its moments have a remarkable property. This is proven two ways: one via generating functions and the other via a combinatorial algorithm. This leads to an asymptotic normality theorem for the number of de

For a finite group G, let k G denote the number of conjugacy classes of G. We prove that a simple group of Lie type of untwisted rank l over the field of q Ž . l elements has at most 6 q conjugacy classes. Using this estimate we show that for Ž . Ž . 10 n completely reducible subgroups G of GL n, q

We compute conjugacy classes in maximal parabolic subgroups of the general linear group. This computation proceeds by reducing to a "matrix problem." Such problems involve finding normal forms for matrices under a specified set of row and column operations. We solve the relevant matrix problem in sm

## Abstract Up to isomorphism, there are only finitely many finite groups with a given number of conjugacy classes. Those with up to twelve classes have already been classified. In this work we extend the classification to thirteen and fourteen classes. (© 2007 WILEY‐VCH Verlag GmbH & Co. KGaA, Wei