比尔曼-希尔登包。二

Pub Date : 2024-03-25 DOI:10.1134/s0037446624020101

A. V. Malyutin

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引用次数: 0

摘要

我们研究了纤维流形的自同构群结构。当一个纤维拓扑空间的每一对保纤（把每条纤维看作一条纤维）自同构中的同构也是纤维同构（通过保纤同构而同构）时，这个空间就是比尔曼-希尔登空间（Birman-Hilden space）。我们特别证明了比尔曼-希尔登类包含圆上所有紧凑相连的局部三维曲面束，包括不可定向的曲面束和边界非空的曲面束，以及圆上所有封闭可定向的哈肯三芒星曲面束，包括不可定向的曲面束。

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Birman–Hilden Bundles. II

We study the structure of self-homeomorphism groups of fibered manifolds. A fibered topological space is a Birman–Hilden space whenever in each isotopic pair of its fiber-preserving (taking each fiber to a fiber) self-homeomorphisms the homeomorphisms are also fiber-isotopic (isotopic through fiber-preserving homeomorphisms). We prove in particular that the Birman–Hilden class contains all compact connected locally trivial surface bundles over the circle, including nonorientable ones and those with nonempty boundary, as well as all closed orientable Haken 3-manifold bundles over the circle, including nonorientable ones.

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