Weighted L2 Holomorphic functions on ball-fiber bundles over compact K\"ahler manifolds

Abstract

Let M be a complex manifold and be a torsion-free cocompact lattice of Aut(M). Let SU(N,1) be a representation and M:= M/ be an n-dimensional compact complex manifold which admits a holomorphic embedding into := BN/(). In this paper, we investigate a relation between weighted L2 holomorphic functions on the fiber bundle :=M× BN and the holomorphic sections of the pull-back bundle -1(SmT*) over M. In particular, A2α() has infinite dimension for any α>-1 and if n<N, then A2-1() also has the same property. As an application, if is a torsion-free cocompact lattice in SU(n,1), n≥ 2, and SU(N,1) is a maximal representation, then for any α>-1, A2α( Bn× BN) has infinite dimension. If n<N, then A-12( Bn× BN) also has the same property.