Denis Auroux
Published 2010-01-25, updated 2010-07-28Version 3
The main goal of this paper is to discuss a symplectic interpretation of Lipshitz, Ozsvath and Thurston's bordered Heegaard-Floer homology in terms of Fukaya categories of symmetric products and Lagrangian correspondences. More specifically, we give a description of the algebra A(F) which appears in the work of Lipshitz, Ozsvath and Thurston in terms of (partially wrapped) Floer homology for product Lagrangians in the symmetric product, and outline how bordered Heegaard-Floer homology itself can conjecturally be understood in this language.
Comments: 54 pages, 11 figures; v3: minor revisions, to appear in J Gokova Geometry Topology
Fukaya categories and bordered Heegaard-Floer homology
Finding a system of essential 2-suborbifolds
Maslov index formulas for Whitney n-gons
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