Bergman–Einstein metrics, a generalization of Kerner’s theorem and Stein spaces with spherical boundaries
Xiaojun Huang, Ming Xiao
Abstract
Abstract We give an affirmative solution to a conjecture of Cheng proposed in 1979 which asserts that the Bergman metric of a smoothly bounded strongly pseudoconvex domain in {\mathbb{C}^{n},n\geq 2} , is Kähler–Einstein if and only if the domain is biholomorphic to the ball. We establish a version of the classical Kerner theorem for Stein spaces with isolated singularities which has an immediate application to construct a hyperbolic metric over a Stein space with a spherical boundary.
Topics & Concepts
MathematicsBounded functionBall (mathematics)Boundary (topology)ConjectureGeneralizationEinsteinPure mathematicsGravitational singularityDomain (mathematical analysis)Bergman spaceSpace (punctuation)Bergman kernelMathematical analysisMetric (unit)Mathematical physicsPhilosophyLinguisticsEconomicsOperations managementHolomorphic and Operator TheoryGeometry and complex manifoldsGeometric Analysis and Curvature Flows