Length minimizing Hamiltonian paths for symplectically aspherical manifolds.
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Publication:1415576
DOI10.5802/aif.1986zbMath1113.53056arXivmath/0206220OpenAlexW1486235110MaRDI QIDQ1415576
Publication date: 8 December 2003
Published in: Annales de l'Institut Fourier (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/math/0206220
Floer homologyHamiltonian diffeomorphismHofer's geometrycoisotropic submanifoldslength minimizing paths
Global theory of symplectic and contact manifolds (53D35) Symplectic aspects of Floer homology and cohomology (53D40)
Related Items
A field theory for symplectic fibrations over surfaces, Bi-invariant metrics on the contactomorphism groups, The Conley conjecture, Coisotropic characteristic classes, Coisotropic intersections, Morse theory for the Hofer length functional, Boundary depth in Floer theory and its applications to Hamiltonian dynamics and coisotropic submanifolds, The bounded isometry conjecture for the Kodaira-Thurston manifold and the 4-torus, Squeezing in Floer theory and refined Hofer-Zehnder capacities of sets near symplectic sub\-manifolds
Cites Work
- Unnamed Item
- Symplectic topology as the geometry of generating functions
- Morse theory for Lagrangian intersections
- Witten's complex and infinite dimensional Morse theory
- Symplectic topology as the geometry of action functional. II: Pants product and cohomological invariants
- Geodesics of Hofer's metric on the group of Hamiltonian diffeomorphisms
- \(\pi_1\) of symplectic automorphism groups and invertibles in quantum homology rings
- Symplectic topology as the geometry of action functional. I: Relative Floer theory on the cotangent bundle
- On the action spectrum for closed symplectically aspherical manifolds
- Hofer-Zehnder capacity and length minimizing Hamiltonian paths
- Estimates for the energy of a symplectic map
- Chain level Floer theory and Hofer's geometry of the Hamiltonian diffeomorphism group.
- Symplectic fixed points and holomorphic spheres
- Geometric variants of the Hofer norm.
- New minimal geodesics in the group of symplectic diffeomorphisms
- Hofer's \(L^ \infty\)-geometry: Energy and stability of Hamiltonian flows. I
- Conjugate points on geodesics of Hofer's metric
- Symplectic diffeomorphisms as isometries of Hofer's norm
- On the topological properties of symplectic maps
- K-area, Hofer metric and geometry of conjugacy classes in Lie groups.
