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Paper detail

A Remark on Unique Ergodicity and the Contact Type Condition

We prove that for a broad class of exact symplectic manifolds including ${\mathbb R}^{2m}$ the Hamiltonian flow on a regular compact energy level of an autonomous Hamiltonian cannot be uniquely ergodic. This is a consequence of the Weinstein conjecture and an observation that a Hamiltonian structure with non-vanishing self-linking number must have contact type. We apply these results to show that certain types of exact twisted geodesic flows cannot be uniquely ergodic.

preprint2015arXivOpen access
Viktor L. GinzburgCesar J. Niche
math.SGmath.DS
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Viktor L. GinzburgCesar J. Niche

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