Rational points on generalized flag varieties and unipotent conjugacy in finite groups of Lie type

Abstract

Let G be a connected reductive algebraic group defined over the finite field q, where q is a power of a good prime for G. We write F for the Frobenius morphism of G corresponding to the q-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 alperin. In order to prove the result mentioned above, we consider, for unipotent u ∈ GF, the variety 0u of G-conjugates of P whose unipotent radical contains u. We prove that the number of q-rational points of 0u is given by a polynomial in q with integer coefficients. Moreover, in case G is split over q and u is split (in the sense of [5]shoji), the coefficients of this polynomial are given by the Betti numbers of 0u. We also prove the analogous results for the variety u consisting of conjugates of P that contain u.

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