Emergence of a Poisson process in weakly interacting particle systems
Abstract
We consider the Gibbs measure of a general interacting particle system for a certain class of ``weakly interacting" kernels. In particular, we show that the local point process converges to a Poisson point process as long as the inverse temperature β satisfies N-1 β N-12, where N is the number of particles. This expands the temperature regime for which convergence to a Poisson point process has been proved.
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