Capacities of billiard tables and \(S^1\)-equivariant loop space homology
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Publication:6601750
DOI10.1007/978-3-031-19111-4_25MaRDI QIDQ6601750
Publication date: 11 September 2024
Variational methods for problems in mechanics (70G75) Differential geometric methods (tensors, connections, symplectic, Poisson, contact, Riemannian, nonholonomic, etc.) for problems in mechanics (70G45)
Cites Work
- Title not available (Why is that?)
- Symplectic homology of disc cotangent bundles of domains in Euclidean space
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- Periodic bounce trajectories with a low number of bounce points
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- Applications of symplectic homology. I
- Topology of cylic configuration spaces and periodic trajectories of multi-dimensional billiards
- Symplectic capacities from positive \(S^1\)-equivariant symplectic homology
- Infinite dimensional Morse theory and multiple solution problems
- Index theory for symplectic paths with applications
- Functors and computations in Floer homology with applications. I
- On the rigidity of Lagrangian products
- Periodic billiard trajectories and Morse theory on loop spaces
- Symplectic embeddings and the Lagrangian bidisk
- Metric and isoperimetric problems in symplectic geometry
- On the filtered symplectic homology of prequantization bundles
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