1.6.3.6 Solution ppe-f

Question:

Show that if the Poisson equation

$\begin{displaymath} \nabla^2 u = f \qquad\mbox{inside}\qquad\Omega \end{displaymath}$

with the Neumann boundary condition

$\begin{displaymath} \frac{\partial u}{\partial n} = g \qquad\mbox{on}\qquad\delta\Omega \end{displaymath}$

has a solution, it is not unique.

Answer:

Suppose you have a solution . Then , where is any arbitrary constant, is also a solution. The constant differentiates away in both the partial differential equation and boundary condition.