Singular Integral Neumann Boundary Conditions for Semilinear Elliptic PDEs
Praveen Agarwal, Jochen Merker, Gregor Schuldt
Abstract
In this article, we discuss semilinear elliptic partial differential equations with singular integral Neumann boundary conditions. Such boundary value problems occur in applications as mathematical models of nonlocal interaction between interior points and boundary points. Particularly, we are interested in the uniqueness of solutions to such problems. For the sublinear and subcritical case, we calculate, on the one hand, illustrative, rather explicit solutions in the one-dimensional case. On the other hand, we prove in the general case the existence and—via the strong solution of an integro-PDE with a kind of fractional divergence as a lower order term—uniqueness up to a constant.
Topics & Concepts
UniquenessMathematicsSublinear functionBoundary value problemNeumann boundary conditionMathematical analysisDivergence (linguistics)Boundary (topology)Partial differential equationMixed boundary conditionPhilosophyLinguisticsDifferential Equations and Boundary ProblemsAdvanced Mathematical Modeling in EngineeringNonlinear Partial Differential Equations