Clark Measures Associated with Rational Inner Functions on Bounded Symmetric Domains

Abstract

Given a bounded symmetric domain D in Cn, we consider the Clark measures μα, α∈ T, associated with a rational inner function from D into the unit disc in C. We show that μα=c|∇ |-1 b D -1(α)· Hm-1, where m is the dimension of the Shilov boundary b D of D and c is a suitable constant. Denoting with H2(μα) the closure of the space of holomorphic polynomials in L2(μα), we characterize the α for which H2(μα)=L2(μα) when D is a polydisc; we also provide some necessary and some sufficient conditions for general domains.

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