Lagrangian Floer Theory and Its Deformations: An Introduction to Filtered Fukaya Category

Oh, Yong-Geun

  • 出版商: Springer
  • 出版日期: 2024-06-07
  • 售價: $4,050
  • 貴賓價: 9.5$3,848
  • 語言: 英文
  • 頁數: 416
  • 裝訂: Hardcover - also called cloth, retail trade, or trade
  • ISBN: 9819717973
  • ISBN-13: 9789819717972
  • 海外代購書籍(需單獨結帳)

相關主題

商品描述

A-infinity structure was introduced by Stasheff in the 1960s in his homotopy characterization of based loop space, which was the culmination of earlier works of Sugawara's homotopy characterization of H-spaces and loop spaces. At the beginning of the 1990s, a similar structure was introduced by Fukaya in his categorification of Floer homology in symplectic topology. This structure plays a fundamental role in the celebrated homological mirror symmetry proposal by Kontsevich and in more recent developments of symplectic topology.
A detailed construction of A-infinity algebra structure attached to a closed Lagrangian submanifold is given in Fukaya, Oh, Ohta, and Ono's two-volume monograph Lagrangian Intersection Floer Theory (AMS-IP series 46 I & II), using the theory of Kuranishi structures--a theory that has been regarded as being not easily accessible to researchers in general. The present lecture note is provided by one of the main contributors to the Lagrangian Floer theory and is intended to provide a quick, reader-friendly explanation of the geometric part of the construction. Discussion of the Kuranishi structures is minimized, with more focus on the calculations and applications emphasizing the relevant homological algebra in the filtered context.
The book starts with a quick explanation of Stasheff polytopes and their two realizations--one by the rooted metric ribbon trees and the other by the genus-zero moduli space of open Riemann surfaces--and an explanation of the A-infinity structure on the motivating example of the based loop space. It then provides a description of the moduli space of genus-zero bordered stable maps and continues with the construction of the (curved) A-infinity structure and its canonical models. Included in the explanation are the (Landau-Ginzburg) potential functions associated with compact Lagrangian submanifolds constructed by Fukaya, Oh, Ohta, and Ono. The book explains calculations of potential functions for toric fibers in detail and reviews several explicit calculations in the literature of potential functions with bulk as well as their applications to problems in symplectic topology via the critical point theory thereof. In the Appendix, the book also provides rapid summaries of various background materials such as the stable map topology, Kuranishi structures, and orbifold Lagrangian Floer theory.

商品描述(中文翻譯)

A-infinity結構是由Stasheff在1960年代引入的,他在基於迴圈空間的同伦特征中提出了這個結構,這是Sugawara對H空間和迴圈空間的早期研究的結晶。在1990年代初,Fukaya在辛拓撲中的Floer同调的范畴化中引入了一個類似的結構。這個結構在Kontsevich的著名同调镜像对偶提案中起著基本作用,並在近期辛拓撲的發展中得到了廣泛應用。

Fukaya, Oh, Ohta和Ono在他們的兩卷本著作《Lagrangian Intersection Floer Theory》(AMS-IP系列46 I&II)中提供了關於閉合拉格朗日子流形的A-infinity代數結構的詳細構造,使用了Kuranishi結構理論,這一理論被認為對一般研究人員來說不容易理解。本講義由拉格朗日Floer理論的主要貢獻者之一提供,旨在對構造的幾何部分提供快速、讀者友好的解釋。講義將對Kuranishi結構的討論最小化,更加關注在過濾上下文中強調相關同调代數的計算和應用。

本書以快速解釋Stasheff多面體及其兩種實現方式開始,一種是基於根據度量的帶狀樹,另一種是基於零亞曼尼曲面的有界稳定映射空间,並對基於迴圈空間的A-infinity結構進行解釋。然後提供了有界稳定映射的零亞曼尼曲面的模空间的描述,並繼續構造(曲線)A-infinity結構及其規范模型。解釋中包括由Fukaya,Oh,Ohta和Ono構造的與緊致拉格朗日子流形相關的(Landau-Ginzburg)势函数。本書詳細解釋了關於鳥瞰纖維的势函数的計算,並回顧了文獻中關於帶有體積的势函数的幾個具體計算,以及它們通過其關鍵點理論對辛拓撲問題的應用。在附錄中,本書還提供了各種背景材料的快速摘要,例如穩定映射拓撲學、Kuranishi結構和奇點空間拉格朗日Floer理論。

作者簡介

Yong-Geun Oh is currently the director of IBS Center for Geometry and Physics and Professor at POSTECH.He previously held positions at University of Wisconsin-Madison. He received Ho-Am Prize in Science in 2022.

作者簡介(中文翻譯)

Yong-Geun Oh目前是IBS幾何與物理中心的主任,也是POSTECH的教授。他之前在威斯康辛大學麥迪遜分校擔任職位。他於2022年獲得了何鴻毅科學獎。