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Paper detail

A Piecewise Deterministic Limit for a Multiscale Stochastic Spatial Gene Network

We consider multiscale stochastic spatial gene networks involving chemical reactions and diffusions. The model is Markovian and the transitions are driven by Poisson random clocks. We consider a case where there are two different spatial scales: a microscopic one with fast dynamic and a macroscopic one with slow dynamic. At the microscopic level, the species are abundant and for the large population limit a partial differential equation (PDE) is obtained. On the contrary at the macroscopic level, the species are not abundant and their dynamic remains governed by jump processes. It results that the PDE governing the fast dynamic contains coefficients which randomly change. The global weak limit is an infinite dimensional continuous piecewise deterministic Markov process (PDMP). Also, we prove convergence in the supremum norm.

preprint2020arXivOpen access
Arnaud DebusscheMac Jugal Nguepedja Nankep
math.PR
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Arnaud DebusscheMac Jugal Nguepedja Nankep

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