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We derive stability estimates in \begin{document}$ H^2 $\end{document} for elliptic problems with impedance boundary conditions that are uniform with respect to the impedance coefficient. Such estimates are of importance to… Click to show full abstract
We derive stability estimates in \begin{document}$ H^2 $\end{document} for elliptic problems with impedance boundary conditions that are uniform with respect to the impedance coefficient. Such estimates are of importance to establish sharp error estimates for finite element discretizations of contact impedance and high-frequency Helm-holtz problems. Though stability in \begin{document}$ H^2 $\end{document} is easily obtained by employing a ``bootstrap'' argument and well-established result for the corresponding Neumann problem, this strategy leads to a stability constant that increases with the impedance coefficient. Here, we propose alternative proofs to derive sharp and uniform stability constants for domains that are convex or smooth.
Journal Title: Communications on Pure and Applied Analysis
Year Published: 2020
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