On the coefficient formula for de Branges-Rovnyak norms

Abstract

Let H(b) be the de Branges-Rovnyak space associated to a non-extreme point b of the unit ball of H∞, and let ϕ=b/a, where a is the Pythagorean mate of b. It is known that, if f is a function holomorphic on a neighbourhood of the closed unit disk, then it belongs to H(b), and its norm in H(b) can be expressed in terms of the Taylor coefficients of f and ϕ via the formula \[ \|f\|H(b)2=Σm0|f(m)|2 +Σm0|Σn0ϕ(n)f(m+n)|2. \] However, the formula can break down for some other f∈H(b). In this article we extend the scope of the formula to all f∈ H2 for which the right-hand side is finite, provided that either ϕ∈ H2 or ϕ is rational. If merely ϕ∈ Hp for some p∈(0,2], then the formula still holds provided that, in addition, Σm0m2/p-1|f(m)|2<∞. We also establish a limit-form of the formula that is valid for all non-extreme b and all f∈H(b).