The modified Calabi-Yau problems for CR-manifolds and applications

Abstract

In this paper, we derive a partial result related to a question of Yau: "Does a simply-connected complete K\"ahler manifold M with negative sectional curvature admit a bounded non-constant holomorphic function?" Main Theorem. Let M2n be a simply-connected complete K\"ahler manifold M with negative sectional curvature -1 and S∞(M) be the sphere at infinity of M. Then there is an explicit bounded contact form β defined on the entire manifold M2n. Consequently, the sphere S∞(M) at infinity of M admits a bounded contact structure and a bounded pseudo-Hermitian metric in the sense of Tanaka-Webster. We also discuss several open modified problems of Calabi and Yau for Alexandrov spaces and CR-manifolds.