On the Ergodicity of Interacting Particle Systems under Number Rigidity

Abstract

In this paper, we provide relations among the following properties: (a) the tail triviality of a probability measure μ on the configuration space ; (b) the finiteness of the L2-transportation-type distance d; (c) the irreducibility of μ-symmetric Dirichlet forms on . As an application, we obtain the ergodicity (i.e., the convergence to the equilibrium) of interacting infinite diffusions having logarithmic interaction arisen from determinantal/permanental point processes including sine2, Airy2, Besselα, 2 (α 1), and Ginibre point processes, in particular, the case of unlabelled Dyson Brownian motion is covered. For the proof, the number rigidity of point processes in the sense of Ghosh--Peres plays a key role.