Completeness of the set \eikβ · s\|∀ β ∈ S2
Abstract
It is proved that the set \eikβ · s\|∀ β ∈ S2, where S2 is the unit sphere in R3, k>0 is a fixed constant, k2 is not a Dirichlet eigenvalue of the Laplacian in D, s∈ S, is total in L2(S). Here S is a smooth, closed, connected surface in R3.
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