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Convergence of a Finite Volume Scheme for a System of Interacting Species with Cross-Diffusion

In this work we present the convergence of a positivity preserving semi-discrete finite volume scheme for a coupled system of two non-local partial differential equations with cross-diffusion. The key to proving the convergence result is to establish positivity in order to obtain a discrete energy estimate to obtain compactness. We numerically observe the convergence to reference solutions with a first order accuracy in space. Moreover we recover segregated stationary states in spite of the regularising effect of the self-diffusion. However, if the self-diffusion or the cross-diffusion is strong enough, mixing occurs while both densities remain continuous.

preprint2020arXivOpen access
José A. CarrilloFrancis FilbetMarkus Schmidtchen
math.NANumerical Analysis
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José A. CarrilloFrancis FilbetMarkus Schmidtchen

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