On holomorphic domination, I

Abstract

Let X be a separable Banach space and u: XR locally upper bounded. We show that there are a Banach space Z and a holomorphic function h: X Z with u(x)<\|h(x)\| for x∈ X. As a consequence we find that the sheaf cohomology group Hq(X,O) vanishes if X has the bounded approximation property (i.e., X is a direct summand of a Banach space with a Schauder basis), O is the sheaf of germs of holomorphic functions on X, and q1. As another consequence we prove that if f is a C1-smooth ∂-closed (0,1)-form on the space X=L1[0,1] of summable functions, then there is a C1-smooth function u on X with ∂ u=f on X.