CAREER: Floer-theoretic approaches to low-dimensional topology

职业：低维拓扑的弗洛尔理论方法

• 批准号: 1149800
• 负责人: Robert Lipshitz
• 金额: $ 40.34万
• 依托单位: Columbia University
• 依托单位国家: 美国
• 项目类别: Continuing Grant
• 财政年份: 2012
• 资助国家: 美国
• 起止时间: 2012-07-01 至 2016-07-31
• 项目状态: 已结题
• 来源: https://www.nsf.gov/awardsearch/showAward?AWD_ID=1149800&HistoricalAwards=false
• 关键词: CAREER; Floer; theoretic; approaches; low

Heegaard Floer homology is family of invariants of objects studied in low-dimensional topology, including closed 3-manifolds, 4-dimensional cobordisms, knots and links in 3-manifolds, and contact structures on 3-manifolds. Bordered Heegaard Floer homology is an extension of Heegaard Floer homology to 3-manifolds with boundary, with good gluing properties. (Roughly, Heegaard Floer homology forms a (3+1)-dimensional topological field theory, and bordered Heegaard Floer homology is a (2+1+1)-dimensional extension of this field theory.) This project seeks to further develop bordered Heegaard Floer homology. The ultimate goals are to find practical ways of computing Heegaard Floer homology (and the Seiberg-Witten invariant); an axiomatic characterization of Heegaard Floer theory; and variants on Heegaard Floer theory capable of answering other topological questions.As is taught in high-school geometry (and was known to the ancient Greeks), three-dimensional space -- the space we live in -- can be sliced into a family of non-intersecting (parallel) planes. It can also be sliced into a family of disks with boundary on the standard, unkotted circle (except that one disk will have a point missing): think of the disks as soap bubbles on a bubble-wand, and the family as coming from blowing on the soap harder or less hard. If you start with a knotted circle K, it may or may not be possible to slice space into a family of surfaces with boundary on K. So, it is natural to ask: for which knots K is there such a family of surfaces? Knots for which there is such a family are called "fibered knots", and finding ways to tell if a knot is fibered turns out to be both interesting and hard. Surprisingly, some of the most effective tools for answering this kind of question are closely related to ideas from modern mathematical physics, quantum field theory, and string theory, and have applications not just to 3-dimensional questions but also to 4-dimensional ones. A family of invariants called Heegaard Floer homology is one such tool. This project seeks to further understand the structure of Heegaard Floer homology, with the goals of developing ways to compute it more efficiently and finding other related tools adapted to different problems.

Heegaard Floer同调是在低维拓扑中研究对象的不变量族，包括闭3-流形，4维配边，3-流形中的纽结和链环，以及3-流形上的接触结构。 加边Heegaard Floer同调是Heegaard Floer同调到有边三维流形的推广，具有良好的胶合性质。 （粗略地说，Heegaard Floer同调形成了一个（3+1）维拓扑场论，而加边Heegaard Floer同调是这个场论的（2+1+1）维扩展。 该项目旨在进一步开发边界Heegaard Floer同源性。最终目标是找到计算Heegaard Floer同调的实用方法（和Seiberg-Witten不变量）; Heegaard Floer理论的公理化特征;以及能够回答其他拓扑问题的Heegaard Floer理论的变体。（古希腊人知道），三维空间-我们生活的空间-可以被切成一个不相交（平行）平面的家庭。它也可以被切割成一个圆盘族，其边界在标准的、不加引号的圆上（除了一个圆盘会有一个点缺失）：把圆盘想象成泡沫棒上的肥皂泡，而这个族是通过用力或不用力地吹肥皂而形成的。 如果你从一个打结的圆K开始，可能也可能不可能将空间切割成一个以K为边界的曲面族。 因此，很自然地要问：对于哪些节点K，有这样一个曲面族吗？ 有这样一个家庭的结被称为“纤维结”，并找到方法来告诉如果一个结是纤维原来是既有趣又困难。 令人惊讶的是，回答这类问题的一些最有效的工具与现代数学物理学、量子场论和弦理论的思想密切相关，不仅适用于三维问题，也适用于四维问题。 一个名为Heegaard Floer homology的不变量家族就是这样一个工具。 该项目旨在进一步了解Heegaard Floer同源性的结构，目标是开发更有效地计算它的方法，并找到适合不同问题的其他相关工具。