A nonvariational form of the acoustic single layer potential
Abstract
We consider a bounded open subset of Rn of class C1,α for some α∈]0,1[ and the space V-1,α(∂) of (distributional) normal derivatives on the boundary of α-H\"older continuous functions in that have Laplace operator in the Schauder space with negative exponent C-1,α(). Then we prove those properties of the acoustic single layer potential that are necessary to analyze the Neumann problem for the Helmholtz equation in with boundary data in V-1,α(∂) and solutions in the space of α-H\"older continuous functions in that have Laplace operator in C-1,α(), i.e., in a space of functions that may have infinite Dirichlet integral. Namely, a Neumann problem that does not belong to the classical variational setting.
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