English

Stability, analytic stability for real reductive Lie groups

Differential Geometry 2022-11-16 v2

Abstract

We presented a systematic treatment of a Hilbert criterion for stability theory for an action of a real reductive group GG on a real submanifold XX of a K\"ahler manifold ZZ. More precisely, we suppose the action of a compact connected Lie group UU with Lie algebra u\mathfrak{u} extends holomorphically to an action of the complexified group UCU^{\mathbb C} and that the UU-action on ZZ is Hamiltonian. If GUCG\subset U^{\mathbb C} is closed and compatible, there is a corresponding gradient map μp:Xp\mu_\mathfrak{p} : X\longrightarrow \mathfrak{p}, where g=kp\mathfrak g = \mathfrak k \oplus \mathfrak p is a Cartan decomposition of the Lie algebra of GG. The concept of energy complete action of GG on XX is introduced. For such actions, one can characterize stability, semistability and polystability of a point by a numerical criteria using a GG-equivariant function associated with a gradient map, called maximal weight function. We also prove the classical Hilbert-Mumford criteria for semistabilty and polystability conditions. We thank the anonymous referee for carefully reading our paper and for giving such constructive comments which substantially helped improving the quality of the paper.

Keywords

Cite

@article{arxiv.2205.04395,
  title  = {Stability, analytic stability for real reductive Lie groups},
  author = {Leonardo Biliotti and Oluwagbenga Joshua Windare},
  journal= {arXiv preprint arXiv:2205.04395},
  year   = {2022}
}

Comments

30 pages, to appear on The Journal of Geometric Analysis

R2 v1 2026-06-24T11:11:44.845Z