We consider a Navier-Stokes model for compressible fluids in one space dimension. We show that it can be approximated by a time-discrete scheme combining the discretization of a trivial stochastic differential equation and the application of a suitable monotonic rearrangement operator In addition, our result can be easily extended to a related Navier-Stokes-Poisson system.
Approximation of the spectrum of a manifold by discretization
Semi-classical limit of Schrodinger-Poisson equations in space dimension at least 3
Approximation of random diffusion equation by nonlocal diffusion equation in free boundary problems of one space dimension
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