Floer homology, gauge theory, and low-dimensional topology : proceedings of the Clay Mathematics Institute 2004 Summer School, Alfréd Rényi Institute of Mathematics, Budapest, Hungary, June 5-26, 2004

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Floer homology, gauge theory, and low-dimensional topology : proceedings of the Clay Mathematics Institute 2004 Summer School, Alfréd Rényi Institute of Mathematics, Budapest, Hungary, June 5-26, 2004

David A. Ellwood ... [et al.], editors

(Clay mathematics proceedings, v. 5)

American Mathematical Society , Clay Mathematics Institute, c2006

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Includes bibliographical references

Description and Table of Contents

Description

Mathematical gauge theory studies connections on principal bundles, or, more precisely, the solution spaces of certain partial differential equations for such connections. Historically, these equations have come from mathematical physics, and play an important role in the description of the electro-weak and strong nuclear forces. The use of gauge theory as a tool for studying topological properties of four-manifolds was pioneered by the fundamental work of Simon Donaldson in the early 1980s, and was revolutionized by the introduction of the Seiberg-Witten equations in the mid-1990s. Since the birth of the subject, it has retained its close connection with symplectic topology.The analogy between these two fields of study was further underscored by Andreas Floer's construction of an infinite-dimensional variant of Morse theory that applies in two a priori different contexts: either to define symplectic invariants for pairs of Lagrangian submanifolds of a symplectic manifold, or to define topological invariants for three-manifolds, which fit into a framework for calculating invariants for smooth four-manifolds. 'Heegaard Floer homology', the recently-discovered invariant for three- and four-manifolds, comes from an application of Lagrangian Floer homology to spaces associated to Heegaard diagrams. Although this theory is conjecturally isomorphic to Seiberg-Witten theory, it is more topological and combinatorial in flavor and thus easier to work with in certain contexts.The interaction between gauge theory, low-dimensional topology, and symplectic geometry has led to a number of striking new developments in these fields. The aim of this volume is to introduce graduate students and researchers in other fields to some of these exciting developments, with a special emphasis on the very fruitful interplay between disciplines. This volume is based on lecture courses and advanced seminars given at the 2004 Clay Mathematics Institute Summer School at the Alfred Renyi Institute of Mathematics in Budapest, Hungary. Several of the authors have added a considerable amount of additional material to that presented at the school, and the resulting volume provides a state-of-the-art introduction to current research, covering material from Heegaard Floer homology, contact geometry, smooth four-manifold topology, and symplectic four-manifolds.

Table of Contents

Heegaard Floer homology and knot theory: An introduction to Heegaard Floer homology by P. S. Ozsvath and Z. Szabo Lectures on Heegaard Floer homology by P. S. Ozsvath and Z. Szabo Circle valued Morse theory for knots and links by H. Goda Floer homologies and contact structures: Lectures on open book decompositions and contact structures by J. B. Etnyre Contact surgery and Heegaard Floer theory by A. I. Stipsicz Ozsvath-Szabo invariants and contact surgery by P. Lisca and A. I. Stipsicz Double points of exact Lagrangian immersions and Legendrian contact homology by T. Ekholm Symplectic 4-manifolds and Seiberg-Witten invariants: Knot surgery revisited by R. Fintushel Will we ever classify simply-connected smooth 4-manifolds? by R. J. Stern A note on symplectic 4-manifolds with $b_{2}^+ =1$ and $K^2 \geq 0$ by J. Park The Kodaira dimension of symplectic 4-manifolds by T.-J. Li Symplectic 4-manifolds, singular plane curves, and isotopy problems by D. Auroux Monodromy, vanishing cycles, knots and the adjoint quotient by I. Smith.

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