If $u(x,y)$ is harmonic on a bounded domain $D$ and continuous on $D \cup B$ where $B$ is the boundary of domain $D$. Then prove that $u(x,y)$ attains its minimum on the boundary $B$.
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You can find a proof that exploites the mean value formula in Evans book Partial Differential Equations (Theorem 4, in chapter 2.2, pg 27).
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