Quantitative Heegaard Floer cohomology and the Calabi invariant

IF 2.8 1区数学 Q1 MATHEMATICS

Forum of Mathematics Pi Pub Date : 2021-05-23 DOI:10.1017/fmp.2022.18

Daniel Cristofaro-Gardiner, Vincent Humilière, C. Y. Mak, Sobhan Seyfaddini, I. Smith

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引用次数: 13

Abstract

Abstract We define a new family of spectral invariants associated to certain Lagrangian links in compact and connected surfaces of any genus. We show that our invariants recover the Calabi invariant of Hamiltonians in their limit. As applications, we resolve several open questions from topological surface dynamics and continuous symplectic topology: We show that the group of Hamiltonian homeomorphisms of any compact surface with (possibly empty) boundary is not simple; we extend the Calabi homomorphism to the group of hameomorphisms constructed by Oh and Müller, and we construct an infinite-dimensional family of quasi-morphisms on the group of area and orientation preserving homeomorphisms of the two-sphere. Our invariants are inspired by recent work of Polterovich and Shelukhin defining and applying spectral invariants, via orbifold Floer homology, for links composed of parallel circles in the two-sphere. A particular feature of our work is that it avoids the orbifold setting and relies instead on ‘classical’ Floer homology. This not only substantially simplifies the technical background but seems essential for some aspects (such as the application to constructing quasi-morphisms).

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定量Heegaard-Floer上同调与Calabi不变量

摘要在任意属的紧连通曲面上，定义了与某些拉格朗日连杆相关的谱不变量族。我们证明了我们的不变量在极限下恢复了哈密顿量的卡拉比不变量。作为应用，我们解决了拓扑曲面动力学和连续辛拓扑中的几个开放性问题:我们证明了任何具有(可能是空的)边界的紧曲面的哈密顿同纯群不是简单的;我们将Calabi同态推广到Oh和m ller构造的同态群上，并在二球的保面积保方向同态群上构造了一个无限维拟同态族。我们的不变量是受到Polterovich和Shelukhin最近的工作的启发，通过对两球中平行圆组成的连杆的轨道Floer同调定义和应用谱不变量。我们的工作的一个特点是，它避免了轨道设置，而是依赖于“经典”花同源性。这不仅大大简化了技术背景，而且对于某些方面(例如构造准态射的应用程序)似乎是必不可少的。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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来源期刊

Forum of Mathematics Pi Mathematics-Statistics and Probability

CiteScore

3.50

自引率

0.00%

发文量

审稿时长

19 weeks

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