WEAK-TYPE NORMAL FAMILIES OF HOLOMORPHIC MAPPINGS IN BANACH SPACES AND CHARACTERIZATION OF THE HILBERT BALL BY ITS AUTOMORPHISM GROUP

Abstract

We present a characterization of the open unit ball in a separable infinite dimensional Hilbert space by the property of automorphism orbits among the domains that are not necessarily bounded. This generalizes the recent work of Kim and Krantz [6]. Key new features of this article include: a lower bound estimate of the Kobayashi metric and distance near a pluri-subharmonic peak boundary point of the domains in Banach spaces, an effective localization argument, and an improvement of weak-type convergence of sequences of biholomorphic mappings of domains in Banach spaces.