Chordal generators and the hydrodynamic normalization for the unit ball

Abstract

Let c≥0 and denote by K(H,c) the set of all infinitesimal generators G:H on the upper half-plane H such that y∞y· |G(iy)|≤ c. This class is related to univalent functions f:H with hydrodynamic normalization and appears in the so called chordal Loewner equation. In this paper, we generalize the class K(H,c) and the hydrodynamic normalization to the Euclidean unit ball in Cn. The generalization is based on the observation that G∈K(H,c) can be characterized by an inequality for the hyperbolic length of G(z).