Compact exact Lagrangian intersections in cotangent bundles via sheaf quantization
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Publication:2279512
DOI10.4171/PRIMS/55-4-3zbMath1429.53098arXiv1701.02057MaRDI QIDQ2279512
Publication date: 12 December 2019
Published in: Publications of the Research Institute for Mathematical Sciences, Kyoto University (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1701.02057
Global theory of symplectic and contact manifolds (53D35) Microlocal methods and methods of sheaf theory and homological algebra applied to PDEs (35A27) Derived categories of sheaves, dg categories, and related constructions in algebraic geometry (14F08) Sheaves in algebraic geometry (14F06)
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- Sheaf quantization of Hamiltonian isotopies and applications to nondisplaceability problems
- On the usefulness of an index due to Leray for studying the intersections of Lagrangian and symplectic paths
- Microlocal branes are constructible sheaves
- Morse inequalities for \({\mathbb{R}{}}\)-constructible sheaves
- The Maslov index for paths
- Nearby Lagrangians with vanishing Maslov class are homotopy equivalent
- Parametrized ring-spectra and the nearby Lagrangian conjecture
- Microlocal condition for non-displaceability
- Exact Lagrangian submanifolds in simply-connected cotangent bundles
- Constructible sheaves and the Fukaya category
- The Symplectic Geometry of Cotangent Bundles from a Categorical Viewpoint
- Graded lagrangian submanifolds
- Microlocal Theory of Sheaves and Tamarkin’s Non Displaceability Theorem
- Floer homology of open subsets and a relative version of Arnold's conjecture
