English

Orbit closures, stabilizer limits and intermediate $G$-varieties

Representation Theory 2023-10-18 v2 Computational Complexity

Abstract

In this paper we study the orbit closure problem for a reductive group GGL(X)G\subseteq GL(X) acting on a finite dimensional vector space VV over \C\C. We assume that the center of GL(X)GL(X) lies within GG and acts on VV through a fixed non-trivial character. We study points y,zVy,z\in V where (i) zz is obtained as the leading term of the action of a 1-parameter subgroup λ(t)G\lambda (t)\subseteq G on yy, and (ii) yy and zz have large distinctive stabilizers K,HGK,H \subseteq G. Let O(z)O(z) (resp. O(y)O(y)) denote the GG-orbits of zz (resp. yy), and O(z)\overline{O(z)} (resp. O(y)\overline{O(y)}) their closures, then (i) implies that zO(y)z\in \overline{O(y)}. We address the question: under what conditions can (i) and (ii) be simultaneously satisfied, i.e, there exists a 1-PS λG\lambda \subseteq G for which zz is observed as a limit of yy. Using λ\lambda, we develop a leading term analysis which applies to VV as well as to G=Lie(G){\cal G}= Lie(G) the Lie algebra of GG and its subalgebras K{\cal K} and H{\cal H}, the Lie algebras of KK and HH respectively. Through this we construct the Lie algebra K^H\hat{\cal K} \subseteq {\cal H} which connects yy and zz through their Lie algebras. We develop the properties of K^\hat{\cal K} and relate it to the action of H{\cal H} on N=V/TzO(z)\overline{N}=V/T_z O(z), the normal slice to the orbit O(z)O(z). We examine the case of {\em alignment} when a semisimple element belongs to both H{\cal H} and K{\cal K}, and the conditions for the same. We illustrate some consequences of alignment. Next, we examine the possibility of {\em intermediate GG-varieties} WW which lie between the orbit closures of zz and yy, i.e. O(z)WO(y)\overline{O(z)} \subsetneq W \subsetneq O(y). These have a direct bearing on representation theoretic as well as geometric properties which connect zz and yy.

Keywords

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}
}
R2 v1 2026-06-28T12:34:01.229Z