横动量图的分层

IF 1.3 1区 数学 Q1 MATHEMATICS
Maarten Mol
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引用次数: 0

摘要

给定一个适当交映群的哈密顿作用(例如,一个紧凑李群的哈密顿作用),我们会证明横动量映射有一个自然的恒等级分层。为此,我们构建了一种与李群作用相关的典型分层的细化(在哈密顿李群作用的情况下是轨道型分层),这种细化以前似乎从未出现过,甚至在哈密顿李群作用的文献中也没有出现过。事实证明,这种细化与哈密顿作用的泊松几何是相容的:它是轨道空间的泊松分层,每个分层都是正则泊松流形,允许一个自然的适当交映群积分它。我们证明中的主要工具(我们相信这可能会引起独立的兴趣)是针对适当交映群像的哈密顿作用的马勒-吉列明-斯特恩伯格法形式定理的一个版本,以及交映群像的哈密顿作用之间的等价性概念,这与交映群像之间的莫里塔等价性密切相关。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Stratification of the transverse momentum map

Given a Hamiltonian action of a proper symplectic groupoid (for instance, a Hamiltonian action of a compact Lie group), we show that the transverse momentum map admits a natural constant rank stratification. To this end, we construct a refinement of the canonical stratification associated to the Lie groupoid action (the orbit type stratification, in the case of a Hamiltonian Lie group action) that seems not to have appeared before, even in the literature on Hamiltonian Lie group actions. This refinement turns out to be compatible with the Poisson geometry of the Hamiltonian action: it is a Poisson stratification of the orbit space, each stratum of which is a regular Poisson manifold that admits a natural proper symplectic groupoid integrating it. The main tools in our proofs (which we believe could be of independent interest) are a version of the Marle–Guillemin–Sternberg normal form theorem for Hamiltonian actions of proper symplectic groupoids and a notion of equivalence between Hamiltonian actions of symplectic groupoids, closely related to Morita equivalence between symplectic groupoids.

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来源期刊
Compositio Mathematica
Compositio Mathematica 数学-数学
CiteScore
2.10
自引率
0.00%
发文量
62
审稿时长
6-12 weeks
期刊介绍: Compositio Mathematica is a prestigious, well-established journal publishing first-class research papers that traditionally focus on the mainstream of pure mathematics. Compositio Mathematica has a broad scope which includes the fields of algebra, number theory, topology, algebraic and differential geometry and global analysis. Papers on other topics are welcome if they are of broad interest. All contributions are required to meet high standards of quality and originality. The Journal has an international editorial board reflected in the journal content.
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