Author Topic: Must harmonic polynomial be homogeneous? (Read 3105 times)

Shentao YANG · « **on:** November 12, 2016, 10:05:03 PM »

Why harmonic polynomial of $deg=n$ must also be homogeneous polynomial of $deg=n$?
Say, $\Delta ({x^2} - {y^2} + z) = 2 - 2 + 0 = 0$, but we do not count $ ({x^2} - {y^2} + z)$ as harmonic polynomial of $deg=2$.

Victor Ivrii · « **Reply #1 on:** November 13, 2016, 10:08:33 AM »

In general NO, but we are looking at homogeneous polynomials. Obviously if a polynomial is harmonic, then all it homogeneous components are also are harmonic.

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Author Topic: Must harmonic polynomial be homogeneous? (Read 3105 times)

Shentao YANG

Must harmonic polynomial be homogeneous?

Victor Ivrii

Re: Must harmonic polynomial be homogeneous?