Lp regularity of the Bergman projection on generalizations of the Hartogs triangle in Cn+1
Abstract
In this paper we investigate a class of domains n+1k =\(z,w)∈ Cn× C: |z|k < |w| < 1\ for k ∈ Z+ which generalizes the Hartogs triangle. we first obtain the new explicit formulas for the Bergman kernel function on these domains and further give a range of p values for which the Lp boundedness of the Bergman projection holds. This range of p is shown to be sharp.
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