Zariski-dense deformations of standard discontinuous groups for pseudo-Riemannian homogeneous spaces

TL;DR

This paper investigates how discrete groups acting on pseudo-Riemannian homogeneous spaces can be deformed while maintaining proper discontinuity, focusing on Zariski-dense deformations and classification of such actions.

Contribution

It provides new classification results and conditions for deformations of standard discontinuous groups in pseudo-Riemannian homogeneous spaces, including Zariski-density and local rigidity.

Findings

Conditions for local rigidity of compact quotients

Characterization of Zariski-closure of deformed groups

Existence of Zariski-dense deformations

Abstract

Let $X=G/H$ be a homogeneous space of a Lie group $G$. When the isotropy subgroup $H$ is non-compact, a discrete subgroup $\Gamma$ may fail to act properly discontinuously on $X$. In this article, we address the following question: in the setting where $G$ and $H$ are reductive Lie groups and $\Gamma \backslash X$ is a standard quotient, to what extent can one deform the discrete subgroup $\Gamma$ while preserving the proper discontinuity of the action on $X$? We provide several classification results, including conditions under which local rigidity holds for compact standard quotients $\Gamma\backslash X$, when a standard quotient can be deformed into a non-standard quotient, a characterization of the largest Zariski-closure of discontinuous groups under small deformations, and conditions under which Zariski-dense deformations occur.