A product of two harmonic functions is not necessarily harmonic
by Hidenori
Proposition
Give an example that shows that the product of two harmonic functions is not necessarily harmonic.
Solution
Let $u(x, y) = x$. Then \(u_{xx} = u_{yy} = 0\). Let $v = u \cdot u$. Then \(v_{xx} = 2, v_{yy} = 0\). Thus $v$ is not harmonic.
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