Nonlocal approximation of nonlinear diffusion equations
José A. Carrillo, Antonio Esposito, Jeremy Sheung-Him Wu
Abstract
Abstract We show that degenerate nonlinear diffusion equations can be asymptotically obtained as a limit from a class of nonlocal partial differential equations. The nonlocal equations are obtained as gradient flows of interaction-like energies approximating the internal energy. We construct weak solutions as the limit of a (sub)sequence of weak measure solutions by using the Jordan-Kinderlehrer-Otto scheme from the context of 2-Wasserstein gradient flows. Our strategy allows to cover the porous medium equation, for the general slow diffusion case, extending previous results in the literature. As a byproduct of our analysis, we provide a qualitative particle approximation.
Topics & Concepts
MathematicsLimit (mathematics)Degenerate energy levelsContext (archaeology)Nonlinear systemCover (algebra)DiffusionMathematical analysisPartial differential equationSequence (biology)Class (philosophy)Applied mathematicsPhysicsComputer scienceGeneticsPaleontologyQuantum mechanicsThermodynamicsBiologyArtificial intelligenceEngineeringMechanical engineeringGeometric Analysis and Curvature FlowsNonlinear Partial Differential EquationsAdvanced Mathematical Physics Problems