Harmonic Bergman Spaces on the Real Hyperbolic Ball: Atomic Decomposition, Interpolation and Inclusion Relations
Abstract
For α>-1 and 0<p<∞, we study weighted Bergman spaces Bpα of harmonic functions on the real hyperbolic ball and obtain an atomic decomposition of these spaces in terms of reproducing kernels. We show that an r-separated sequence \am\ with sufficiently large r is an interpolating sequence for Bpα. Using these we determine precisely when a Bergman space Bpα is included in another Bergman space Bqβ.
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