Complex Hyperbolic Geometry and Hilbert Spaces with the Complete Pick Property

Abstract

Suppose H is a finite dimensional reproducing kernel Hilbert space of functions on X. If H has the complete Pick property then there is an isometric map, , from X, with the metric induced by H, into complex hyperbolic space, CHn, with its pseudohyperbolic metric. We investigate the relationships between the geometry of (X) and the function theory of H and its multiplier algebra.