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Monotome Lagrange submanifolds of linear spaces and the Maslov class in cotangent bundles.

Leonid Polterovich — 1991

Mathematische Zeitschrift

Hamiltonian loops from the ergodic point of view

Leonid Polterovich — 1999

Journal of the European Mathematical Society

Let $G$ be the group of Hamiltonian diffeomorphisms of a closed symplectic manifold $Y$ . A loop $h : S^{1} \to G$ is called strictly ergodic if for some irrational number the associated skew product map $T : S^{1} \times Y \to S^{1} \times Y$ defined by $T (t, y) = (t + α; h (t) y)$ is strictly ergodic. In the present paper we address the following question. Which elements of the fundamental group of $G$ can be represented by strictly ergodic loops? We prove existence of contractible strictly ergodic loops for a wide class of symplectic manifolds (for instance for simply connected...

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Currently displaying 1 – 5 of 5

Monotome Lagrange submanifolds of linear spaces and the Maslov class in cotangent bundles.

Hamiltonian loops from the ergodic point of view

Symplectic packings and algebraic geometry. (with an Appendix by Y. Karshon).

Hamiltonian systems, Lagrangian tori and Birkhoffs's theorem.

Geometry on the group of Hamiltonian diffeomorphisms.