Random Hamiltonians I: Probability measures and random walks on the Hamiltonian diffeomorphism group
Abstract
We construct a family of probability measures on the group of Hamiltonian diffeomorphisms of a closed symplectic manifold (M,ω). We show that these measures are Borel measures with respect to the topology induced by the Hofer metric. Further, we show that these measures turn any Hofer-Lipschitz function into a random variable with finite expectation. These measures have (for suitable choices of parameters) several desirable properties, such as full support on Ham(M,ω), explicit estimates of the measure of Hofer-balls, and certain controls under the action of the group. We also define a family of probability measures on the space of autonomous Hamiltonian diffeomorphisms. These measures have similar properties and give rise to a random walk on the group Ham(M,ω). Finally, we show that under certain limits this construction gives rise to probability measures on the space of Hamiltonian homeomorphisms and on the metric completion of Ham(M,ω) with respect to the Hofer metric and the spectral metric.
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