Markov Evolution of Continuum Particle Systems with Dispersion and Competition
Abstract
We construct birth-and-death Markov evolution of states(distributions) of point particle systems in Rd. In this evolution, particles reproduce themselves at distant points (disperse) and die under the influence of each other (compete). The main result is a statement that the corresponding correlation functions evolve in a scale of Banach spaces and remain sub-Poissonian, and hence no clustering occurs, if the dispersion is subordinate to the competition.
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