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Symmetry results for critical anisotropic p-Laplacian equations in convex cones

Giulio Ciraolo, Alessio Figalli, Alberto Roncoroni

2020Virtual Community of Pathological Anatomy (University of Castilla La Mancha)75 citationsDOIOpen Access PDF

Abstract

Given n≥ 2 and 1 < p< n, we consider the critical p-Laplacian equation Δpu+up∗-1=0, which corresponds to critical points of the Sobolev inequality. Exploiting the moving planes method, it has been recently shown that positive solutions in the whole space are classified. Since the moving plane method strongly relies on the symmetries of the equation and the domain, in this paper we provide a new approach to this Liouville-type problem that allows us to give a complete classification of solutions in an anisotropic setting. More precisely, we characterize solutions to the critical p-Laplacian equation induced by a smooth norm inside any convex cone. In addition, using optimal transport, we prove a general class of (weighted) anisotropic Sobolev inequalities inside arbitrary convex cones.

Topics & Concepts

MathematicsHomogeneous spaceSobolev spaceRegular polygonNorm (philosophy)Mathematical analysisAnisotropyLaplace operatorPure mathematicsp-LaplacianDomain (mathematical analysis)GeometryPhysicsLawBoundary value problemPolitical scienceQuantum mechanicsNonlinear Partial Differential EquationsAdvanced Mathematical Modeling in EngineeringNumerical methods in inverse problems
Symmetry results for critical anisotropic p-Laplacian equations in convex cones | Litcius