Litcius/Paper detail

The Cauchy-Dirichlet problem for singular nonlocal diffusions on bounded domains

Matteo Bonforte, Peio Ibarrondo, Mikel Ispizua

2022Discrete and Continuous Dynamical Systems12 citationsDOIOpen Access PDF

Abstract

We study the Cauchy-Dirichlet Problem (CDP) for a nonlinear and nonlocal diffusion equation of singular type of the form $ \partial_t u = - \mathcal{L} u^m $ posed on a bounded Euclidean domain $ \Omega\subset \mathbb{R}^N $ with smooth boundary and $ N\ge 1 $. The linear diffusion operator $ \mathcal{L} $ is a sub-Markovian operator, allowed to be of nonlocal type, while the nonlinearity is of singular type, namely $ u^m = |u|^{m-1}u $ with $ 0<m<1 $. The prototype equation is the Fractional Fast Diffusion Equation (FFDE), when $ \mathcal{L} $ is one of the three possible Dirichlet Fractional Laplacians on $ \Omega $.We provide a complete basic theory for solutions to (CDP): existence and uniqueness in the biggest class of data known so far, both for nonnegative and signed solutions; sharp smoothing estimates: classical $ L^p-L^\infty $ smoothing effects, and new weighted estimates, which represent a novelty also in local case, i.e. $ u_t = \Delta u^m $. We compare two strategies to prove smoothing effects: Moser iteration VS Green function method.Due to the singular nonlinearity and to presence of nonlocal diffusion operators, the question of how solutions satisfy the lateral boundary conditions is delicate and we answer it by quantitative upper boundary estimates.Finally, we show that solutions extinguish in finite time and we provide upper and lower estimates for the extinction time, together with explicit sharp extinction rates in different norms.

Topics & Concepts

Bounded functionDirichlet boundary conditionMathematicsUniquenessBoundary (topology)Operator (biology)Mathematical analysisType (biology)Domain (mathematical analysis)Sublinear functionSmoothingDirichlet problemCauchy distributionPure mathematicsBoundary value problemStatisticsBiochemistryEcologyTranscription factorGeneRepressorChemistryBiologyAdvanced Mathematical Modeling in EngineeringNonlinear Partial Differential EquationsNonlinear Differential Equations Analysis