A Markov process for an infinite age-structured population
Abstract
For an infinite system of particles arriving in and departing from a habitat X -- a locally compact Polish space with a positive Radon measure -- a Markov process is constructed in an explicit way. Along with its location x∈ X, each particle is characterized by age α≥ 0 -- time since arriving. As the state space one takes the set of marked configurations , equipped with a metric that makes it a complete and separable metric space. The stochastic evolution of the system is described by a Kolmogorov operator L, expressed through the measure and a departure rate m(x,α)≥ 0, and acting on bounded continuous functions F: R. For this operator, we pose the martingale problem and show that it has a unique solution, explicitly constructed in the paper. We also prove that the corresponding process has a unique stationary state and is temporarily egrodic if the rate of departure is separated away from zero.
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