An ergodic theorem with weights and applications to random measures, RW homogenization and IPS hydrodynamics on point processes
Abstract
We prove a multidimensional ergodic theorem with weighted averages for the action of the group Zd on a probability space. At level n weights are of the form n-d (j/n), j∈ Zd, for real functions decaying suitably fast. We discuss applications to random measures and to quenched stochastic homogenization of random walks on simple point processes with long-range random jump rates, allowing to remove the technical Assumption (A9) from [Theorem~4.4]Fhom1. This last result concerns also some semigroup and resolvent convergence particularly relevant for the derivation of the quenched hydrodynamic limit of interacting particle systems via homogenization and duality. As a consequence we show that also the quenched hydrodynamic limit of the symmetric simple exclusion process on point processes stated in [Theorem~4.1]FSEP remains valid when removing the above mentioned Assumption (A9).
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