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Pré-Publication, Document De Travail Année : 2018

Convergence of a Degenerate Microscopic Dynamics of the Porous Medium Equation

Résumé

We derive the porous medium equation from an interacting particle system which belongs to the family of exclusion processes, with nearest neighbor exchanges. The particles follow a degenerate dynamics, in the sense that the jump rates can vanish for certain configurations, and there exist blocked configurations that cannot evolve. In [7] it was proved that the macroscopic density profile in the hydrodynamic limit is governed by the porous medium equation (PME), for initial densities uniformly bounded away from 0 and 1. In this paper we consider the more general case where the density can take those extreme values. In this context, the PME solutions display a richer behavior, like moving interfaces, finite speed of propagation and breaking of regularity. As a consequence, the standard techniques that are commonly used to prove this hydrodynamic limits cannot be straightforwardly applied to our case. We present here a way to generalize the relative entropy method, by involving approximations of solutions to the hydrodynamic equation, instead of exact solutions.
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Dates et versions

hal-01710628 , version 1 (16-02-2018)
hal-01710628 , version 2 (26-04-2018)
hal-01710628 , version 3 (17-07-2019)

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  • HAL Id : hal-01710628 , version 1

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Oriane Blondel, Clément Cancès, Makiko Sasada, Marielle Simon. Convergence of a Degenerate Microscopic Dynamics of the Porous Medium Equation. 2018. ⟨hal-01710628v1⟩
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