A Markov process for an infinite interacting particle system in the continuum

Abstract

An infinite system of point particles placed in Rd is studied. Its constituents perform random jumps with mutual repulsion described by a translation-invariant jump kernel and interaction potential, respectively. The pure states of the system are locally finite subsets of Rd, which can also be interpreted as locally finite Radon measures. The set of all such measures is equipped with the vague topology and the corresponding Borel σ-field. For a special class P exp of (sub-Poissonian) probability measures on , we prove the existence of a unique family \Pt,μ: t≥ 0, \ μ ∈ P exp\ of probability measures on the space of cadlag paths with values in that solves a restricted initial-value martingale problem for the mentioned system. Thereby, a Markov process with cadlag paths is specified which describes the stochastic dynamics of this particle system.