English

Complexity of actions over perfect fields

Algebraic Geometry 2020-06-23 v1 Representation Theory Symplectic Geometry

Abstract

Let GG be a connected reductive group over a perfect field kk acting on an algebraic variety XX and let PP be a minimal parabolic subgroup of GG. For kk-spherical GG-varieties we prove finiteness result for PP-orbits that contain kk-points. This is a consequence of an equality on PP-complexities of XX and of any PP-invariant kk-dense subvariety in XX, which generalizes a corresponding result of E.B.Vinberg in the case of algebraically closed field kk. Also we introduce an action of the restricted Weyl group WW on the set of kk-dense PP-invariant closed subvarieties of XX of maximal PP-complexity and kk-rank in the case of char k=0{\rm char}\ k =0 and on the set of all kk-dense PP-orbits in the case of real spherical variety which generalizes the action on BB-orbits introduced by F.Knop in the algebraically closed field case. We also introduce a little Weyl group related with this action and describe its generators in terms of the generators of WW which generalize the description of M.Brion in algebraically closed field case.

Keywords

Cite

@article{arxiv.2006.11659,
  title  = {Complexity of actions over perfect fields},
  author = {Friedrich Knop and Vladimir S. Zhgoon},
  journal= {arXiv preprint arXiv:2006.11659},
  year   = {2020}
}
R2 v1 2026-06-23T16:29:23.782Z