Orbit closures, stabilizer limits and intermediate $G$-varieties
Abstract
In this paper we study the orbit closure problem for a reductive group acting on a finite dimensional vector space over . We assume that the center of lies within and acts on through a fixed non-trivial character. We study points where (i) is obtained as the leading term of the action of a 1-parameter subgroup on , and (ii) and have large distinctive stabilizers . Let (resp. ) denote the -orbits of (resp. ), and (resp. ) their closures, then (i) implies that . We address the question: under what conditions can (i) and (ii) be simultaneously satisfied, i.e, there exists a 1-PS for which is observed as a limit of . Using , we develop a leading term analysis which applies to as well as to the Lie algebra of and its subalgebras and , the Lie algebras of and respectively. Through this we construct the Lie algebra which connects and through their Lie algebras. We develop the properties of and relate it to the action of on , the normal slice to the orbit . We examine the case of {\em alignment} when a semisimple element belongs to both and , and the conditions for the same. We illustrate some consequences of alignment. Next, we examine the possibility of {\em intermediate -varieties} which lie between the orbit closures of and , i.e. . These have a direct bearing on representation theoretic as well as geometric properties which connect and .
Cite
@article{arxiv.2309.15816,
title = {Orbit closures, stabilizer limits and intermediate $G$-varieties},
author = {Bharat Adsul and Milind Sohoni and K V Subrahmanyam},
journal= {arXiv preprint arXiv:2309.15816},
year = {2023}
}