Composition operators between de Branges-Rovnyak and Hardy spaces
Abstract
Let d 1 and φ: Bd be a holomorphic function, where Bd denotes the open unit ball of Cd and D = B1. Let b: D D be a holomorphic function and H(b) denote the corresponding de Branges-Rovnyak space. We show that compactness of the composition operator Cφ from H(b) to the Hardy space H2(Bd) is related to natural restrictions on the Nevanlinna counting functions of the slice-functions φζ, ζ∈ ∂ Bd.
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