H-Harmonic Bergman Projection on the Hyperbolic Ball

Abstract

We determine precisely when the Bergman projection Pβ is bound\-ed from Lebesgue spaces Lpα to weighted Bergman spaces Bpα of H-harmonic functions on the hyperbolic ball, and verify a recent conjecture of M. Stoll. We obtain upper estimates for the reproducing kernel of the H-harmonic Bergman space B2α and its partial derivatives. We also consider the projection from L∞ to the Bloch space B of H-harmonic functions.

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