Symmetrization of plurisubharmonic and convex functions
Abstract
We show that Schwarz symmetrization does not increase the Monge-Ampere energy for S1-invariant plurisubharmonic functions in the ball. As a result we derive a sharp Moser-Trudinger inequality for such functions. We also show that similar results do not hold for general balanced domains except for complex ellipsoids and discuss related questions for convex functions.
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