Symmetric differentials and jets extension of L2 holomorphic functions

Abstract

Let = Bn/ be a complex hyperbolic space with discrete subgroup of the automorphism group of the unit ball Bn and be a quotient of Bn × Bn under the diagonal action of which is a holomorphic Bn-fiber bundle over . The goal of this article is to investigate the relation between symmetric differentials of and the weighted L2 holomorphic functions of . If there exists a holomorphic function on and it vanishes up to k-th order on the maximal compact complex variety in , then there exists a symmetric differential of degree k+1 on . Using this property, we show that always has a symmetric differential of degree N for any N ≥ n+2. Moreover if is compact, for each symmetric differential over we construct a weighted L2 holomorphic function on . We also show that any bounded holomorphic function on is constant when H0 (, Sm T* )=0 for every 0 < m ≤ n+1.