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The Maslov index in symplectic Banach spaces / Bernhelm Booss-Bavnbek, Chaofeng Zhu.

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Memoirs of the American Mathematical Society - 2018 Available online

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Format:
Book
Author/Creator:
Booss, Bernhelm, 1941- author.
Zhu, Chaofeng, 1973- author.
Series:
Memoirs of the American Mathematical Society ; Volume 252, Number 1201.
Memoirs of the American Mathematical Society, 0065-9266 ; Volume 252, Number 1201
Language:
English
Subjects (All):
Symplectic spaces.
Banach spaces.
Physical Description:
1 online resource (134 pages).
Edition:
1st ed.
Place of Publication:
Providence, RI : American Mathematical Society, [2018]
Summary:
The authors consider a curve of Fredholm pairs of Lagrangian subspaces in a fixed Banach space with continuously varying weak symplectic structures. Assuming vanishing index, they obtain intrinsically a continuously varying splitting of the total Banach space into pairs of symplectic subspaces. Using such decompositions the authors define the Maslov index of the curve by symplectic reduction to the classical finite-dimensional case. The authors prove the transitivity of repeated symplectic reductions and obtain the invariance of the Maslov index under symplectic reduction while recovering all the standard properties of the Maslov index. As an application, the authors consider curves of elliptic operators which have varying principal symbol, varying maximal domain and are not necessarily of Dirac type. For this class of operator curves, the authors derive a desuspension spectral flow formula for varying well-posed boundary conditions on manifolds with boundary and obtain the splitting formula of the spectral flow on partitioned manifolds.
Contents:
Cover
Title page
List of Figures
Preface
Introduction
Part 1 . Maslov index in symplectic Banach spaces
Chapter 1. General theory of symplectic analysis in Banach spaces
1.1. Dual pairs and double annihilators
1.2. Basic symplectic concepts
1.3. Natural decomposition of induced by a Fredholm pair of Lagrangian subspaces with vanishing index
1.4. Symplectic reduction of Fredholm pairs
Chapter 2. The Maslov index in strong symplectic Hilbert space
2.1. The Maslov index via unitary generators
2.2. The Maslov index in finite dimensions
2.3. Properties of the Maslov index in strong symplectic Hilbert space
Chapter 3. The Maslov index in Banach bundles over a closed interval
3.1. The Maslov index by symplectic reduction to a finite-dimensional subspace
3.2. Calculation of the Maslov index
3.3. Invariance of the Maslov index under symplectic operations
3.4. The Hörmander index
Part 2 . Applications in global analysis
Chapter 4. The desuspension spectral flow formula
4.1. Short account of predecessor formulae
4.2. Spectral flow for closed self-adjoint Fredholm relations
4.3. Symplectic analysis of operators and relations
4.4. Proof of the abstract spectral flow formula
4.5. An application: A general desuspension formula for the spectral flow of families of elliptic boundary value problems
Backmatter
Appendix A. Perturbation of closed subspaces in Banach spaces
A.1. Some algebra facts
A.2. The gap topology
A.3. Continuity of operations of linear subspaces
A.4. Smooth family of closed subspaces in Banach spaces
A.5. Basic facts about symplectic Banach bundles
A.6. Embedding Banach spaces
A.7. Compact perturbations of closed subspaces
Bibliography
List of Symbols
Index of Names/Authors
Subject Index
Back Cover.
Notes:
Includes bibliographical references and index.
Description based on print version record.
ISBN:
1-4704-4371-6

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