The one-weight inequality for H-harmonic Bergman projection
Abstract
Let n≥slant 3 be an integer. For the Bekoll\'e-Bonami weight ω on the real unit ball Bn, we obtain the following sharp one-weight estimate for the H-harmonic Bergman projection: for 1<p<∞ and -1<α<∞, \[||Pα|| Lp(ω dα) Lp(ω dα)≤slant C [ω]p,α\1,1p-1\, \] where [ω]p,α is the Bekoll\'e-Bonami constant. Our proof is inspired by the dyadic harmonic analysis, and the key ingredient involves the discretization of the Bergman kernel for the H-harmonic Bergman spaces.
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