On Dirichlet-type and n-isometric shifts in finite rank de~Branges--Rovnyak spaces

Abstract

This paper studies the function spaces D(μ) by Richter and Aleman, and Dμ by the second author. It is known that the forward shift Mz is bounded and expansive on D(μ), and therefore D(μ) coincides with a de~Branges--Rovnyak space H[B]. We show that such a B is rational if and only if μ is finitely atomic, and this happens exactly when the corresponding defect operator has finite rank. We also outline a method for calculating the reproducing kernel of D(μ) for finitely atomic μ. Similarly, we characterize the allowable tuples μ = (|dz|2π, μ1, …, μn-1) such that Mz on Dμ is expansive with finite rank defect operator. This investigation provides many interesting examples of normalized allowable tuples μ.

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