Intermediate Pseudoconvexity of Fiber Bundles
Abstract
In this paper, we investigate the pseudoconvexity of locally trivial holomorphic ball bundles over compact Riemann surfaces of genus ≥ 2, as well as the intermediate pseudoconvexity of their complements in the associated projective space bundles. Inspired by Brunella's work, we prove that any such ball bundle is 1-convex, while its complement is n-convex, where n denotes the dimension of the ball fiber, provided that the bundle admits a harmonic section with a regular point.
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