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Advanced Engineering Mathematics
10th Edition
ISBN:9780470458365
Author:Erwin Kreyszig
Publisher:Erwin Kreyszig
Chapter2: Second-order Linear Odes
Section: Chapter Questions
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### Example (1)
Assume \( u_1 \) solves 
\[
\begin{cases} 
\Delta u_1 = f & \text{on } D \\ 
u_1 = g & \text{on } \partial D 
\end{cases}
\]
and \( u_2 \) solves 
\[
\begin{cases} 
\Delta u_2 = f & \text{on } D \\ 
u_2 = g_2 & \text{on } \partial D 
\end{cases}
\]
where \( D \) is a disk of radius 10 centered at (1,2) in the \( xy \)-plane.

If \(\max_{\partial D} |g_2 - g| < \epsilon\), show that \(\max_{D} |u_1 - u_2| < \epsilon\).
Transcribed Image Text:### Example (1) Assume \( u_1 \) solves \[ \begin{cases} \Delta u_1 = f & \text{on } D \\ u_1 = g & \text{on } \partial D \end{cases} \] and \( u_2 \) solves \[ \begin{cases} \Delta u_2 = f & \text{on } D \\ u_2 = g_2 & \text{on } \partial D \end{cases} \] where \( D \) is a disk of radius 10 centered at (1,2) in the \( xy \)-plane. If \(\max_{\partial D} |g_2 - g| < \epsilon\), show that \(\max_{D} |u_1 - u_2| < \epsilon\).
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