Ebook: Gauge Theory and Symplectic Geometry
- Tags: Differential Geometry, Algebraic Topology, Global Analysis and Analysis on Manifolds, Applications of Mathematics, Partial Differential Equations
- Series: NATO ASI Series 488
- Year: 1997
- Publisher: Springer Netherlands
- Edition: 1
- Language: English
- pdf
Gauge theory, symplectic geometry and symplectic topology are important areas at the crossroads of several mathematical disciplines. The present book, with expertly written surveys of recent developments in these areas, includes some of the first expository material of Seiberg-Witten theory, which has revolutionised the subjects since its introduction in late 1994.
Topics covered include: introductions to Seiberg-Witten theory, to applications of the S-W theory to four-dimensional manifold topology, and to the classification of symplectic manifolds; an introduction to the theory of pseudo-holomorphic curves and to quantum cohomology; algebraically integrable Hamiltonian systems and moduli spaces; the stable topology of gauge theory, Morse-Floer theory; pseudo-convexity and its relations to symplectic geometry; generating functions; Frobenius manifolds and topological quantum field theory.
Gauge theory, symplectic geometry and symplectic topology are important areas at the crossroads of several mathematical disciplines. The present book, with expertly written surveys of recent developments in these areas, includes some of the first expository material of Seiberg-Witten theory, which has revolutionised the subjects since its introduction in late 1994.
Topics covered include: introductions to Seiberg-Witten theory, to applications of the S-W theory to four-dimensional manifold topology, and to the classification of symplectic manifolds; an introduction to the theory of pseudo-holomorphic curves and to quantum cohomology; algebraically integrable Hamiltonian systems and moduli spaces; the stable topology of gauge theory, Morse-Floer theory; pseudo-convexity and its relations to symplectic geometry; generating functions; Frobenius manifolds and topological quantum field theory.
Gauge theory, symplectic geometry and symplectic topology are important areas at the crossroads of several mathematical disciplines. The present book, with expertly written surveys of recent developments in these areas, includes some of the first expository material of Seiberg-Witten theory, which has revolutionised the subjects since its introduction in late 1994.
Topics covered include: introductions to Seiberg-Witten theory, to applications of the S-W theory to four-dimensional manifold topology, and to the classification of symplectic manifolds; an introduction to the theory of pseudo-holomorphic curves and to quantum cohomology; algebraically integrable Hamiltonian systems and moduli spaces; the stable topology of gauge theory, Morse-Floer theory; pseudo-convexity and its relations to symplectic geometry; generating functions; Frobenius manifolds and topological quantum field theory.
Content:
Front Matter....Pages i-xvii
Lectures on gauge theory and integrable systems....Pages 1-48
Symplectic geometry of plurisubharmonic functions....Pages 49-67
Frobenius manifolds....Pages 69-112
Moduli spaces and particle spaces....Pages 113-146
J-holomorphic curves and symplectic invariants....Pages 147-174
Lectures on Gromov invariants for symplectic 4-manifolds....Pages 175-210
Back Matter....Pages 211-212
Gauge theory, symplectic geometry and symplectic topology are important areas at the crossroads of several mathematical disciplines. The present book, with expertly written surveys of recent developments in these areas, includes some of the first expository material of Seiberg-Witten theory, which has revolutionised the subjects since its introduction in late 1994.
Topics covered include: introductions to Seiberg-Witten theory, to applications of the S-W theory to four-dimensional manifold topology, and to the classification of symplectic manifolds; an introduction to the theory of pseudo-holomorphic curves and to quantum cohomology; algebraically integrable Hamiltonian systems and moduli spaces; the stable topology of gauge theory, Morse-Floer theory; pseudo-convexity and its relations to symplectic geometry; generating functions; Frobenius manifolds and topological quantum field theory.
Content:
Front Matter....Pages i-xvii
Lectures on gauge theory and integrable systems....Pages 1-48
Symplectic geometry of plurisubharmonic functions....Pages 49-67
Frobenius manifolds....Pages 69-112
Moduli spaces and particle spaces....Pages 113-146
J-holomorphic curves and symplectic invariants....Pages 147-174
Lectures on Gromov invariants for symplectic 4-manifolds....Pages 175-210
Back Matter....Pages 211-212
....
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