Domains with Bergman metrics of constant curvature and Bergman-negligible subsets
Abstract
Let D be a bounded domain in Cn. Suppose the holomorphic sectional curvature of its Bergman metric equals a negative constant τ. We show that D is biholomorphic to a domain equal to the unit ball in Cn less a relatively closed set of measure zero, and that all L2-holomorphic functions on extend to L2-holomorphic functions on the ball. Consequently, τ must equal the holomorphic sectional curvature of the unit ball. This generalizes a classical theorem of Lu. Some applications of the theorem, especially in extending classical work of Wong and Rosay, are also presented.
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