Free Jump Dynamics in Continuum

Abstract

The evolution is described of an infinite system of hopping point particles in Rd. The states of the system are probability measures on the space of configurations of particles. Under the condition that the initial state μ0 has correlation functions of all orders which are: (a) kμ0(n) ∈ L∞ ((Rd)n) (essentially bounded); (b) \|kμ0(n)\| L∞ ((Rd)n) ≤ Cn, n∈ N (sub-Poissonian), the evolution μ0 μt, t>0, is obtained as a continuously differentiable map kμ0 kt, kt =(kt(n))n∈ N, in the space of essentially bounded sub-Poissonian functions. In particular, it is proved that kt solves the corresponding evolution equation, and that for each t>0 it is the correlation function of a unique state μt.