粘接双曲塞得到传递ansov流的唯一性定理

Pub Date : 2023-09-07 DOI:10.2140/agt.2023.23.2673
Francois Beguin, Bin Yu
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引用次数: 3

摘要

在之前与C. Bonatti([5])合作的一篇论文中,我们定义了一个通用的过程来构建维度3的Anosov流的新示例。这个过程包括沿着它们的边界将一些称为双曲塞的构件粘合在一起,以获得一个具有完整流的封闭3流形。[5]的主要定理指出(在一些温和的假设下)可以选择粘合映射,从而得到ansov流。本文的目的是证明用这种方法得到的阿诺索夫流的唯一性结果。粗略地说,我们证明了这些阿诺索夫流的轨道等效类对构造中使用的粘合图的精确选择不敏感。这个证明依赖于一个编码过程,我们觉得它本身很有趣,并遵循T. Barbot在一个特殊情况下引入的策略。
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A uniqueness theorem for transitive Anosov flows obtained by gluing hyperbolic plugs
In a previous paper with C. Bonatti ([5]), we have defined a general procedure to build new examples of Anosov flows in dimension 3. The procedure consists in gluing together some building blocks, called hyperbolic plugs, along their boundary in order to obtain a closed 3-manifold endowed with a complete flow. The main theorem of [5] states that (under some mild hypotheses) it is possible to choose the gluing maps so the resulting flow is Anosov. The aim of the present paper is to show a uniqueness result for Anosov flows obtained by such a procedure. Roughly speaking, we show that the orbital equivalence class of these Anosov flows is insensitive to the precise choice of the gluing maps used in the construction. The proof relies on a coding procedure which we find interesting for its own sake, and follows a strategy that was introduced by T. Barbot in a particular case.
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