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Convergence rate for the incompressible limit of nonlinear diffusion–advection equations

Noemi David, Tomasz Dębiec, Benoı̂t Perthame

2022Annales de l Institut Henri Poincaré C Analyse Non Linéaire17 citationsDOIOpen Access PDF

Abstract

The incompressible limit of nonlinear diffusion equations of porous medium type has attracted a lot of attention in recent years, due to its ability to link the weak formulation of cellpopulation models to free boundary problems of Hele–Shaw type. Although a vast literature is available on this singular limit, little is known on the convergence rate of the solutions. In this work, we compute the convergence rate in a negative Sobolev norm and, upon interpolating with BV-uniform bounds, we deduce a convergence rate in appropriate Lebesgue spaces.

Topics & Concepts

CompressibilityLimit (mathematics)Convergence (economics)Nonlinear systemRate of convergenceAdvectionDiffusionPolitical scienceMathematical physicsMathematicsHumanitiesPhysicsMathematical analysisMechanicsEconomicsPhilosophyComputer scienceThermodynamicsEconomic growthComputer networkChannel (broadcasting)Quantum mechanicsAdvanced Mathematical Modeling in EngineeringMathematical Biology Tumor GrowthNonlinear Partial Differential Equations
Convergence rate for the incompressible limit of nonlinear diffusion–advection equations | Litcius