The central objects in the book are Lagrangian submanifolds and their invariants, such as Floer homology and its multiplicative structures, which together. Get this from a library! Fukaya categories and Picard-Lefschetz theory. [Paul Seidel; European Mathematical Society.] — “The central objects in. symplectic manifolds. Informally speaking, one can view the theory as analogous .. object F(π), the Fukaya category of the Lefschetz fibration π, and then prove Fukaya categories and Picard-Lefschetz theory. European.
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Generally, the emphasis is on simplicity rather than generality.
Well, I do try to have tbeory geometric understanding of anything I can… but I personally gravitate more towards anything higher category-theortic, so I suppose it would be the latter. Ordering on the AMS Bookstore is limited to individuals for personal use only.
Fukaya Categories and Picard-Lefschetz Theory – Paul Seidel – Google Books
Sign up or fheory in Sign up using Google. Sign up categorids Email and Password. Read, highlight, and take notes, across web, tablet, and phone. Print Price 1 Label: The central objects in the book are Lagrangian submanifolds and their invariants, such as Floer homology and its multiplicative structures, which together constitute the Fukaya category. Expected availability date February 07, What references are there for learning about Fukaya categories specifically, good references for self-study?
Publication Month and Year: A google search yielded this: Good to know that Konstevich’s paper is good, since I was planning on reading through it no matter what!
Review: Fukaya Categories and Picard-Lefschetz Theory | EMS
The author first presents the main ideas by giving a preliminary construction and then he proceeds in greater generality, though nad complete generality already present in recent literature is not reached. Home Questions Tags Users Unanswered.
Skip to main content. European Mathematical Society Amazon. The last part treats Lefschetz fibrations and their Fukaya categories and briefly illustrates the theory on the example of Am-type Milnor fibres.
Fukaya Categories and Picard–Lefschetz Theory
The central objects in the book are Lagrangian submanifolds and their invariants, such as Floer homology and its multiplicative structures, which together constitute the Fukaya category. A little symplectic geometry.
D I’ll have to head over to the library and check out Seidel’s book tomorrow — thanks! Graduate dukaya and research mathematicians interested in geometry and topology.
The relevant aspects of pseudo-holomorphic curve theory are covered in some detail, and there is also a self-contained account of the necessary homological algebra.
Libraries and resellers, please contact cust-serv ams. I am asking if anyone personally recommends references that they have read on the subject that they find to be good introductions especially for self-studyin order to whittle down the references I have to a few good ones.
Distributed within the Americas by the American Mathematical Society. The book is written in an austere style and references for more detailed literature are given whenever needed.
Account Options Sign in. The book will be of interest to graduate students and researchers in symplectic geometry and mirror symmetry. Email Required, but never shown. Author s Product display: The relevant aspects of pseudo-holomorphic curve theory are covered in some detail, and there is also a self-contained