Nonlocal cross-diffusion systems for multi-species populations and networks
Ansgar Jüngel, Stefan Portisch, Antoine Zurek
Abstract
Nonlocal cross-diffusion systems on the torus, arising in population dynamics and neuroscience, are analyzed. The global existence of weak solutions, the weak–strong uniqueness, and the localization limit are proved. The kernels are assumed to be in detailed balance. The proofs are based on entropy estimates coming from Shannon-type and Rao-type entropies, while the weak–strong uniqueness result follows from the relative entropy method. The existence and uniqueness theorems hold for nondifferentiable, only integrable kernels. The associated local cross-diffusion system, derived in the localization limit, is also discussed.
Topics & Concepts
UniquenessMathematicsMathematical proofTorusLimit (mathematics)Entropy (arrow of time)PopulationIntegrable systemDiffusionStatistical physicsApplied mathematicsPure mathematicsMathematical analysisPhysicsQuantum mechanicsGeometrySociologyDemographyMathematical and Theoretical Epidemiology and Ecology ModelsMathematical Biology Tumor Growthstochastic dynamics and bifurcation