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Lagrangian Floer theory over integers: Spherically positive symplectic manifolds

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Title
Lagrangian Floer theory over integers: Spherically positive symplectic manifolds
Author(s)
Kenji Fukaya; Yong-Geun Oh; Hiroshi Ohta; Kaoru Ono
Subject
Floer cohomology, Lagrangian submanifolds, orbifold, stack, stratified space, pseudo-holomorphic curve, spherically positive symplectic manifold
Publication Date
2013-04
Journal
PURE AND APPLIED MATHEMATICS QUARTERLY, v.9, no.2, pp.189 - 289
Publisher
INT PRESS BOSTON
Abstract
In this paper we study the Lagrangian Floer theory over Z or Z2. Under an appropriate assumption on ambient symplectic manifold, we show that the whole story of Lagrangian Floer theory in [6], [7] can be developed over Z2 coefficients, and over Z coefficients when Lagrangian submanifolds are relatively spin. The main technical tools used for the construction are the notion of the sheaf of groups, and stratification and compatibility of the normal cones applied to the Kuranishi structure of the moduli space of pseudo-holomorphic discs.
URI
https://pr.ibs.re.kr/handle/8788114/814
DOI
10.4310/PAMQ.2013.v9.n2.a1
ISSN
1558-8599
Appears in Collections:
Center for Geometry and Physics(기하학 수리물리 연구단) > 1. Journal Papers (저널논문)
Files in This Item:
2013-Pure and Applied Mathematics Quarterly-LagrangianFloertheoryoverintegers_sphericallypositivesymplecticmanifolds.pdfDownload

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