A three-spheres theorem holds for harmonic functions in weighted L2 norm on non-concentric non-touching spheres in R^n via inversion, extending the concentric case with applications to uniqueness.
Korevaar,Chebyshev-type quadratures: use of complex analysis and potential theory, Complex potential theory, NATO ASI Ser
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Three-spheres theorem for harmonic functions (non-concentric case)
A three-spheres theorem holds for harmonic functions in weighted L2 norm on non-concentric non-touching spheres in R^n via inversion, extending the concentric case with applications to uniqueness.