Kahlerity of invariant metrics on pseudoconvex domain of dimension two
Abstract
For a two dimensional bounded pseudoconvex domain of finite type, we prove uniformization theorems via Kahler-Kobayashi metric or Kahler-Caratheodory metric with quasi-finite geometry of order three. In particular, a pseudoconvex Reinhardt domain of finite type is the unit ball if and only if the Bergman metric is a scalar multiple of the Kobayashi metric or Caratheodory metric. Moreover, we establish a rigidity theorem concerning holomorphic sectional curvature of Bergman metric and Lu constant.
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