A uniqueness theorem for nonvariational solutions of the Helmholtz equation
Abstract
We consider a bounded open subset of Rn of class C1,α for some α∈]0,1[, and we define a distributional outward unit normal derivative for α-H\"older continuous solutions of the Helmholtz equation in the exterior of that may not have a classical outward unit normal derivative at the boundary points of and that may have an infinite Dirichlet integral around the boundary of . Namely for solutions that do not belong to the classical variational setting. Then we show a Schauder boundary regularity result for α-H\"older continuous functions that have the Laplace operator in a Schauder space of negative exponent and we prove a uniqueness theorem for α-H\"older continuous solutions of the exterior Dirichlet and impedance boundary value problems for the Helmholtz equation that satisfy the Sommerfeld radiation condition at infinity in the above mentioned nonvariational setting.
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