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On the Hölder regularity of signed solutions to a doubly nonlinear equation

Verena Bögelein, Frank Duzaar, Naian Liao

2021Journal of Functional Analysis39 citationsDOIOpen Access PDF

Abstract

We establish the interior and boundary Hölder continuity of possibly sign-changing solutions to a class of doubly nonlinear parabolic equations whose prototype is∂t(|u|p−2u)−Δpu=0,p>1. The proof relies on the property of expansion of positivity and the method of intrinsic scaling, all of which are realized by De Giorgi's iteration. Our approach, while emphasizing the distinct roles of sub(super)-solutions, is flexible enough to obtain the Hölder regularity of solutions to initial-boundary value problems of Dirichlet type or Neumann type in a cylindrical domain, up to the parabolic boundary. In addition, based on the expansion of positivity, we are able to give an alternative proof of Harnack's inequality for non-negative solutions. Moreover, as a consequence of the interior estimates, we also obtain a Liouville-type result.

Topics & Concepts

MathematicsHarnack's inequalityHölder conditionMathematical analysisNonlinear systemBoundary (topology)Type (biology)Domain (mathematical analysis)Boundary value problemSign (mathematics)Neumann boundary conditionParabolic partial differential equationDirichlet boundary conditionPure mathematicsPartial differential equationBiologyPhysicsEcologyQuantum mechanicsNonlinear Partial Differential EquationsAdvanced Mathematical Modeling in EngineeringNumerical methods in inverse problems
On the Hölder regularity of signed solutions to a doubly nonlinear equation | Litcius