Asymptotic of a wave potential that is concentrated on the line (Q1069026)

Let \({\mathcal D}\) be the exterior of the smooth surface \(S: \xi =1+\epsilon g(\eta,\epsilon),\quad 0\leq \phi \leq 2\pi\) in \(R^ 3\), \(\xi\), \(\eta\), \(\phi\) are the spheroidal coordinates. Consider the Dirichlet problem \[ (1)\quad \Delta u=0\quad in\quad {\mathcal D},\quad u=h\quad on\quad S,\quad u(\infty)=0 \] where \(h\in C^{\infty}(S)\). For every integer \(N\geq 1\) there is constructed the function \(u_ N\) such that \(\Delta u_ N=0\) in \({\mathcal D}\), \(u_ N(\infty)=0\), \(| u-u_ N| \leq C_ N \epsilon^ N\) in \(\bar {\mathcal D}\), for \(0\leq \epsilon \leq \epsilon_ 0\). Analogical results are stated for Neumann's problem.