Abstract
We consider a stochastic system of particles in a two dimensional lattice and prove that, under a suitable limit (i.e.N→∞, e→0,Ne2→const, whereN is the number of particles and e is the mesh of the lattice) the one-particle distribution function converges to a solution of the two-dimensional Broadwell equation for all times for which the solution (of this equation) exists. Propagation of chaos is also proven.
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