On embeddings of certain spherical homogeneous spaces in prime characteristic

Abstract

Let G be a reductive group over an algebraically closed field of characteristic p>0. We study homogeneous G-spaces that are induced from the G× G-space G, G a suitable reductive group, along a parabolic subgroup of G. We show that, under certain mild assumptions, any (normal) equivariant embedding of such a homogeneous space is canonically Frobenius split compatible with certain subvarieties and has an equivariant rational resolution by a toroidal embedding. In particular, all these embeddings are Cohen-Macaulay. Examples are the G× G-orbits in normal reductive monoids with unit group G. Our class of homogeneous spaces also includes the open orbits of the well-known determinantal varieties and the varieties of (circular) complexes. We also show that all G-orbit closures in a spherical variety which is canonically Frobenius split are normal. Finally we study the Gorenstein property for the varieties of circular complexes and for a related reductive monoid.