Microlocal Morse theory of wrapped Fukaya categories | Annals of Mathematics

IF 5.7 1区 数学 Q1 MATHEMATICS
Sheel Ganatra, John Pardon, Vivek Shende
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引用次数: 0

Abstract

The Nadler–Zaslow correspondence famously identifies the finite-dimensional Floer homology groups between Lagrangians in cotangent bundles with the finite-dimensional Hom spaces between corresponding constructible sheaves. We generalize this correspondence to incorporate the infinite-dimensional spaces of morphisms “at infinity,” given on the Floer side by Reeb trajectories (also known as “wrapping”) and on the sheaf side by allowing unbounded infinite rank sheaves which are categorically compact. When combined with existing sheaf theoretic computations, our results confirm many new instances of homological mirror symmetry. \par More precisely, given a real analytic manifold $M$ and a subanalytic isotropic subset $\Lambda$ of its co-sphere bundle $S^*M$, we show that the partially wrapped Fukaya category of $T^*M$ stopped at $\Lambda$ is equivalent to the category of compact objects in the unbounded derived category of sheaves on $M$ with microsupport inside $\Lambda$. By an embedding trick, we also deduce a sheaf theoretic description of the wrapped Fukaya category of any Weinstein sector admitting a stable polarization.

缠绕 Fukaya 类别的微局域莫尔斯理论 | 数学年刊
著名的纳德勒-扎斯洛(Nadler-Zaslow)对应关系将共切线束中拉格朗日之间的有限维弗洛尔同调群与相应的可构造剪子之间的有限维霍姆(Hom)空间联系起来。我们将这一对应关系推广到 "无穷大 "形态的无穷维空间,在弗洛尔一侧通过里布轨迹(也称为 "包裹")给出,在剪子一侧通过允许无限制的无穷级剪子分类紧凑给出。结合现有的剪子理论计算,我们的结果证实了许多新的同调镜像对称实例。\更精确地说,给定一个实解析流形 $M$ 和它的共球束 $S^*M$ 的一个亚解析等向子集 $\Lambda$,我们证明了止于 $\Lambda$ 的部分包裹的 Fukaya 范畴等价于在 $\Lambda$ 内具有微支持的剪子在 $M$ 上的无界派生范畴中的紧凑对象范畴。通过嵌入技巧,我们还推导出了对任何允许稳定极化的韦恩斯坦扇形的包裹富卡亚范畴的剪子理论描述。
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
Annals of Mathematics
Annals of Mathematics 数学-数学
CiteScore
9.10
自引率
2.00%
发文量
29
审稿时长
12 months
期刊介绍: The Annals of Mathematics is published bimonthly by the Department of Mathematics at Princeton University with the cooperation of the Institute for Advanced Study. Founded in 1884 by Ormond Stone of the University of Virginia, the journal was transferred in 1899 to Harvard University, and in 1911 to Princeton University. Since 1933, the Annals has been edited jointly by Princeton University and the Institute for Advanced Study.
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