Orthogonal polynomials in de Branges--Rovnyak spaces

Abstract

Given a function b, holomorphic on the disc and bounded by 1, one can construct an associated reproducing kernel Hilbert space called the de Branges--Rovnyak space H(b). We explore representations of such spaces via descriptions of the corresponding families of orthogonal polynomials. We find relevant structures in the linear systems involved in a diversity of cases when b is rational. We also establish a form of invariance under some composition operators on H(b) spaces.

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