Equivariant models of spherical varieties

Abstract

Let G be a connected semisimple group over an algebraically closed field k of characteristic 0. Let Y=G/H be a spherical homogeneous space of G, and let Y' be a spherical embedding of Y. Let k0 be a subfield of k. Let G0 be a k0 -model (k0-form) of G. We show that if G0 is an inner form of a split group and if the subgroup H of G is spherically closed, then Y admits a G0-equivariant k0-model. If we replace the assumption that H is spherically closed by the stronger assumption that H coincides with its normalizer in G, then Y and Y' admit compatible G0-equivariant k0-models, and these models are unique.