Convergence rate for the incompressible limit of nonlinear diffusion–advection equations
Noemi David, Tomasz Dębiec, Benoı̂t Perthame
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