预量化束的嵌入接触同源性

Pub Date : 2024-06-06 DOI:10.4310/jsg.2023.v21.n6.a1

Jo Nelson, Morgan Weiler

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引用次数: 0

摘要

2011 年法里斯的博士论文[Fa]证明了黎曼曲面上预量化束的 ECH 作为 $\mathbb{Z}^2$ 阶群与其基底同调的外部代数是同构的。我们通过计算链复数上的（$\mathbb{Z}^2$）分级来扩展这一结果，从而可以更精细地理解这一同构性，并得出 ECH 的稳定性结果。我们补充了一些技术细节，包括莫尔斯-波特直接极限论证和某些$J$同构建筑的分类。前者需要哈钦斯-陶布斯（Hutchings-Taubes）[HT13]建立的过滤塞伯格-维滕弗洛尔同调与过滤 ECH 之间的同构。后者需要克里斯托法罗-加迪纳-哈钦斯-张[CGHZ]关于伪全形曲线的高渐近性的工作，以获得必要的writhe边界，从而诉诸哈钦斯-纳尔逊[HN16]的交集理论论证。

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Embedded contact homology of prequantization bundles

The 2011 PhD thesis of Farris [Fa] demonstrated that the ECH of a prequantization bundle over a Riemann surface is isomorphic as a $\mathbb{Z}^2$-graded group to the exterior algebra of the homology of its base. We extend this result by computing the $\ mathbb{Z}$-grading on the chain complex, permitting a finer understanding of this isomorphism and a stability result for ECH. We fill in a number of technical details, including the Morse–Bott direct limit argument and the classification of certain $J$-holomorphic buildings. The former requires the isomorphism between filtered Seiberg–Witten Floer cohomology and filtered ECH as established by Hutchings–Taubes [HT13]. The latter requires the work on higher asymptotics of pseudoholomorphic curves by Cristofaro-Gardiner–Hutchings–Zhang [CGHZ] to obtain the writhe bounds necessary to appeal to an intersection theory argument of Hutchings–Nelson [HN16].

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