作为凸函数极小值的玻尔-索默菲尔德拉格朗日子流形

Pub Date : 2018-03-19 DOI:10.4310/jsg.2020.v18.n1.a9

Alexandre Vérine

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引用次数: 4

摘要

证明了辛/K\ ahler流形$X$的每一个闭玻尔-索默菲尔德拉格朗日子流形$Q$对于定义在辛/复超平面截面$Y$补上的某个“凸”耗尽函数都可以被实现为Morse-Bott极小值。在K\ ahler情况下，“凸”指的是严格的多次调和，而在辛情况下，它指的是Liouville伪梯度的存在。特别地，Q\子集X\set - Y$是Eliashberg-Ganatra-Lazarev意义上的正则拉格朗日子流形。

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Bohr–Sommerfeld Lagrangian submanifolds as minima of convex functions

We prove that every closed Bohr-Sommerfeld Lagrangian submanifold $Q$ of a symplectic/K\"ahler manifold $X$ can be realised as a Morse-Bott minimum for some 'convex' exhausting function defined in the complement of a symplectic/complex hyperplane section $Y$. In the K\"ahler case, 'convex' means strictly plurisubharmonic while, in the symplectic case, it refers to the existence of a Liouville pseudogradient. In particular, $Q\subset X\setminus Y$ is a regular Lagrangian submanifold in the sense of Eliashberg-Ganatra-Lazarev.

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