由t2不变前辛形式的核所定义的叶的紧致叶

Mathematical Journal of Ibaraki University Pub Date : 2022-08-28 DOI:10.5036/mjiu.54.1

A. Hagiwara

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引用次数: 0

摘要

研究了在(2n + r)维闭流形M上由2n阶的精确预辛形式dα的核所定义的叶化。当r = 2时，如果M存在一个局部自由的t2 -作用，且保留dα，且满足函数α (z2)是常数，其中z1, z2是t2 -作用的无穷小产生子，则证明叶形至少有两个叶形同胚于二维环面。我们也给出了它在r≥1时的推广。

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Compact leaves of the foliation defined by the kernel of a T2-invariant presymplectic form

We investigate the foliation deﬁned by the kernel of an exact presymplectic form dα of rank 2 n on a (2 n + r )-dimensional closed manifold M . For r = 2, we prove that the foliation has at least two leaves which are homeomorphic to a 2-dimensional torus, if M admits a locally free T 2 -action which preserves dα and satisﬁes that the function α ( Z 2 ) is constant, where Z 1 , Z 2 are the inﬁnitesimal generators of the T 2 -action. We also give its generalization for r ≥ 1.

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Mathematical Journal of Ibaraki University

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