Rational points on generalized flag varieties and unipotent
conjugacy in finite groups of Lie type
Rational points on generalized flag varieties and unipotent
conjugacy in finite groups of Lie type
Let G be a connected reductive algebraic group defined over the finite field Fq, where q is a power of a good prime for G. We write F for the Frobenius morphism of G corresponding to the Fq-structure, so that GF is a finite group of Lie type. Let P be an F-stable parabolic subgroup of G and U the unipotent radical of P. In this paper, we prove
that the number of UF -conjugacy classes in GF is given by a polynomial in q, under the assumption that the centre of G is connected. This answers a question of J. Alperin in [1].
In order to prove the result mentioned above, we consider, for unipotent u ? GF , the variety P0u of G-conjugates of P whose unipotent radical contains u. We prove that the number of Fq-rational points of P0u is given by a polynomial in q with integer coefficients.
Moreover, in case G is split over Fq and u is split (in the sense of [22, §5]), the coefficients of this polynomial are given by the Betti numbers of P0u. We also prove the analogous results for the variety Pu consisting of conjugates of P that contain u.
Goodwin, Simon M.
4c962131-c809-44bc-bc9a-a90290fba029
Roehrle, Gerhard
85f9d4eb-d522-4a95-bde9-300e8e3e7886
Goodwin, Simon M.
4c962131-c809-44bc-bc9a-a90290fba029
Roehrle, Gerhard
85f9d4eb-d522-4a95-bde9-300e8e3e7886
Goodwin, Simon M. and Roehrle, Gerhard
(2006)
Rational points on generalized flag varieties and unipotent
conjugacy in finite groups of Lie type.
Transactions of the American Mathematical Society.
(In Press)
Abstract
Let G be a connected reductive algebraic group defined over the finite field Fq, where q is a power of a good prime for G. We write F for the Frobenius morphism of G corresponding to the Fq-structure, so that GF is a finite group of Lie type. Let P be an F-stable parabolic subgroup of G and U the unipotent radical of P. In this paper, we prove
that the number of UF -conjugacy classes in GF is given by a polynomial in q, under the assumption that the centre of G is connected. This answers a question of J. Alperin in [1].
In order to prove the result mentioned above, we consider, for unipotent u ? GF , the variety P0u of G-conjugates of P whose unipotent radical contains u. We prove that the number of Fq-rational points of P0u is given by a polynomial in q with integer coefficients.
Moreover, in case G is split over Fq and u is split (in the sense of [22, §5]), the coefficients of this polynomial are given by the Betti numbers of P0u. We also prove the analogous results for the variety Pu consisting of conjugates of P that contain u.
This record has no associated files available for download.
More information
Submitted date: March 2006
Accepted/In Press date: March 2006
Identifiers
Local EPrints ID: 42891
URI: http://eprints.soton.ac.uk/id/eprint/42891
ISSN: 0002-9947
PURE UUID: 94bd0b19-1a64-4ae7-bed8-a215a7c255de
Catalogue record
Date deposited: 14 Dec 2006
Last modified: 11 Dec 2021 16:13
Export record
Contributors
Author:
Simon M. Goodwin
Author:
Gerhard Roehrle
Download statistics
Downloads from ePrints over the past year. Other digital versions may also be available to download e.g. from the publisher's website.
View more statistics