家庭的moser - green - shiohama稳定性

Pub Date : 2019-01-01 DOI:10.4310/jsg.2019.v17.n5.a6

Á. Pelayo, Xiudi Tang

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引用次数: 2

摘要

设M是一个非紧定向连通流形设B是一个紧流形。我们给出了体积形式{ω p} p∈B， {τ p} p∈B的两个光滑族的条件，保证了微分同态{φ p} p∈B的光滑族的存在，使得对于所有p∈B， φ∗p ω p = τ p。如果B是一个点，我们的结果恢复了1979年Greene和Shiohama的一个定理，该定理本身推广了Moser关于紧流形的一个定理。

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Moser–Greene–Shiohama stability for families

Let M be a noncompact oriented connected manifold and let B be a compact manifold. We give conditions on two smooth families of volume forms { ω p } p ∈ B , { τ p } p ∈ B which guarantee the existence of a smooth family of diﬀeomorphisms { ϕ p } p ∈ B such that ϕ ∗ p ω p = τ p for all p ∈ B . If B is a point, our result recovers a theorem of Greene and Shiohama from 1979, which itself extended a theorem of Moser for compact manifolds.

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