条形码与保面积同胚

IF 2 1区数学

Geometry & Topology Pub Date : 2018-10-07 DOI:10.2140/gt.2021.25.2713

F. Roux, Sobhan Seyfaddini, C. Viterbo

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引用次数: 24

摘要

本文将条形码理论作为研究保面积同胚动力学的新工具。我们将证明曲面的哈密顿微分同态的条形码连续依赖于该微分同态，并进一步定义哈密顿同胚的条形码。我们主要的动力学应用是关于弱共轭的概念，这是一个与哈密顿同胚的C^0连续共轭不变量有关的等价关系。证明了一类具有有限个不动点的哈密顿同纯，不动点的数目是一个弱共轭不变量。除了条形码理论外，这一证明还依赖于表面动力学的技术，如勒·卡尔维兹的横向叶理理论。在我们对条形码和持久模块的阐述中，我们提出了一个结合Barannikov的简单莫尔斯复合体理论的等距定理的证明。

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Barcodes and area-preserving homeomorphisms

In this paper we use the theory of barcodes as a new tool for studying dynamics of area-preserving homeomorphisms. We will show that the barcode of a Hamiltonian diffeomorphism of a surface depends continuously on the diffeomorphism, and furthermore define barcodes for Hamiltonian homeomorphisms. Our main dynamical application concerns the notion of {\it weak conjugacy}, an equivalence relation which arises naturally in connection to $C^0$ continuous conjugacy invariants of Hamiltonian homeomorphisms. We show that for a large class of Hamiltonian homeomorphisms with a finite number of fixed points, the number of fixed points, counted with multiplicity, is a weak conjugacy invariant. The proof relies, in addition to the theory of barcodes, on techniques from surface dynamics such as Le Calvez's theory of transverse foliations. In our exposition of barcodes and persistence modules, we present a proof of the Isometry Theorem which incorporates Barannikov's theory of simple Morse complexes.

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来源期刊

Geometry & Topology 数学-数学

自引率

5.00%

发文量

期刊介绍： Geometry and Topology is a fully refereed journal covering all of geometry and topology, broadly understood. G&T is published in electronic and print formats by Mathematical Sciences Publishers. The purpose of Geometry & Topology is the advancement of mathematics. Editors evaluate submitted papers strictly on the basis of scientific merit, without regard to authors" nationality, country of residence, institutional affiliation, sex, ethnic origin, or political views.