English

Stratified Gradient Hamiltonian Vector Fields and Collective Integrable Systems

Symplectic Geometry 2025-04-22 v7 Algebraic Geometry Representation Theory

Abstract

We construct completely integrable systems on the dual of the Lie algebra of any compact Lie group KK with respect to the standard Lie-Poisson structure. These systems generalize key properties of Gelfand-Zeitlin systems: A) the pullback to any Hamiltonian KK-manifold defines a Hamiltonian torus action on an open dense subset, B) if the KK-manifold is multiplicity-free, then the resulting torus action is \textit{completely} integrable, and C) the collective moment map has convexity and fiber connectedness properties. These systems generalize the relationship between Gelfand-Zeitlin systems and Gelfand-Zeitlin canonical bases via geometric quantization by a real polarization. To construct these systems, we generalize Harada and Kaveh's construction of integrable systems by toric degeneration on smooth projective varieties to singular quasi-projective varieties. Under certain conditions, we show that the stratified-gradient Hamiltonian vector field of such a degeneration, which is defined piece-wise, has a flow whose limit exists and defines continuous degeneration map.

Keywords

Cite

@article{arxiv.2008.13656,
  title  = {Stratified Gradient Hamiltonian Vector Fields and Collective Integrable Systems},
  author = {Benjamin Hoffman and Jeremy Lane},
  journal= {arXiv preprint arXiv:2008.13656},
  year   = {2025}
}

Comments

Final accepted version

R2 v1 2026-06-23T18:12:50.539Z