Spherical varieties over large fields
Abstract
Let k_0 be a field of characteristic 0, k its algebraic closure, G a connected reductive group defined over k. Let H\subset G be a spherical subgroup. We assume that k_0 is a large field, for example, k_0 is either the field R of real numbers or a p-adic field. Let G_0 be a quasi-split k_0-form of G. We show that if H has self-normalizing normalizer, and Gal(k/k_0) preserves the combinatorial invariants of G/H, then H is conjugate to a subgroup defined over k_0, and hence, the G-variety G/H admits a G_0-equivariant k_0-form. In the case when G_0 is not assumed to be quasi-split, we give a necessary and sufficient Galois-cohomological condition for the existence of a G_0-equivariant k_0-form of G/H.
Keywords
Cite
@article{arxiv.1805.01871,
title = {Spherical varieties over large fields},
author = {Stephan Snegirov},
journal= {arXiv preprint arXiv:1805.01871},
year = {2019}
}
Comments
18 pages. arXiv admin note: text overlap with arXiv:1804.08475 by other authors