Clark measures and de Branges-Rovnyak spaces in several variables

Abstract

Let Bn denote the unit ball of Cn, n 1, and let D denote a finite product of Bnj, j 1. Given a non-constant holomorphic function b: D B1, we study the corresponding family σα[b], α∈∂ B1, of Clark measures on the distinguished boundary ∂D. We construct a natural unitary operator from the de Branges-Rovnyak space H(b) onto the Hardy space H2(σα). As an application, for D= Bn and an inner function I: Bn B1, we show that the property σ1[I]σ1[b] is directly related to the membership of an appropriate explicit function in H(b).