Stable spherical varieties and their moduli
Abstract
We introduce a notion of stable spherical variety which includes the spherical varieties under a reductive group and their flat equivariant degenerations. Given any projective space where acts linearly, we construct a moduli space for stable spherical varieties over , that is, pairs , where is a stable spherical variety and is a finite equivariant morphism. This space is projective, and its irreducible components are rational. It generalizes the moduli space of pairs , where is a stable toric variety and is an effective ample Cartier divisor on which contains no orbit. The equivariant automorphism group of acts on our moduli space; the spherical varieties over and their stable limits form only finitely many orbits. A variant of this moduli space gives another view to the compactifications of quotients of thin Schubert cells constructed by Kapranov and Lafforgue.
Cite
@article{arxiv.math/0505673,
title = {Stable spherical varieties and their moduli},
author = {Valery Alexeev and Michel Brion},
journal= {arXiv preprint arXiv:math/0505673},
year = {2007}
}
Comments
50 pages