A sharp constant for the Bergman projection
Abstract
For the Bergman projection operator P we prove that \|P\|L1(B,dλ)→ B1= (2n+1)!n!. Here λ stands for the invariant metric in the unit ball B of Cn, and B1 denotes the Besov space with an adequate semi--norm. We also consider a generalization of this result. This generalizes some recent results due to Per\"al\"a.
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