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A topological approach to nonlocal elliptic partial differential equations on an annulus

Christopher S. Goodrich

2020Mathematische Nachrichten45 citationsDOI

Abstract

Abstract For we consider the nonlocal ordinary differential equation subject to the Dirichlet boundary conditions . Due to the term appearing in the equation, this is a class of nonlocal differential equations. By using a novel order cone we are able to establish existence of a positive solution to this problem by means of topological fixed point theory. The preceding problem is really a special case of a more general problem that we consider – namely, the existence of a positive radially symmetric solution to the nonlocal elliptic partial differential equation subject to , for , where Ω is an annular region when .

Topics & Concepts

MathematicsElliptic partial differential equationMathematical analysisDirichlet boundary conditionPartial differential equationAnnulus (botany)Boundary value problemDirichlet problemOrdinary differential equationDifferential equationCone (formal languages)First-order partial differential equationClass (philosophy)AlgorithmArtificial intelligenceComputer scienceBotanyBiologyNonlinear Differential Equations AnalysisAdvanced Mathematical Modeling in EngineeringDifferential Equations and Boundary Problems