Nicolas Fournier, Stéphane Mischler
Published 2013-02-23, updated 2014-05-11Version 2
We consider the (numerically motivated) Nanbu stochastic particle system associated to the spatially homogeneous Boltzmann equation for true hard potentials. We establish a rate of propagation of chaos of the particle system to the unique solution of the Boltzmann equation. More precisely, we estimate the expectation of the squared Wasserstein distance with quadratic cost between the empirical measure of the particle system and the solution. The rate we obtain is almost optimal as a function of the number of particles but is not uniform in time.
On the convergence of statistical solutions of the 3D Navier-Stokes-$α$ model as $α$ vanishes
Convergence of the Ostrovsky equation to the Ostrovsky-Hunter one
Convergence of the self-dual Ginzburg-Landau gradient flow
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