Generalized de Branges-Rovnyak spaces

Abstract

Given the reproducing kernel k of the Hilbert space Hk we study spaces Hk(b) whose reproducing kernel has the form k(1-bb*), where b is a row-contraction on Hk. In terms of reproducing kernels this it the most far-reaching generalization of the classical de Branges-Rovnyaks spaces, as well as their very recent generalization to several variables. This includes the so called sub-Bergman spaces in one or several variables. We study some general properties of Hk(b) e.g. when the inclusion map into H is compact. Our main result provides a model for Hk(b) reminiscent of the Sz.-Nagy-Foias model for contractions. As an application we obtain sufficient conditions for the containment and density of the linear span of \kw:w∈X\ in Hk(b). In the standard cases this reduces to containment and density of polynomials. These methods resolve a very recent conjecture regarding polynomial approximation in spaces with kernel (1-b(z)b(w)*)m(1-z w)β, 1≤ m<β, m∈N.

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