Constructive approximation in de Branges-Rovnyak spaces

Abstract

In most classical holomorphic function spaces on the unit disk, a function f can be approximated in the norm of the space by its dilates f\r(z):=f(rz)~(r 1). We show that this is not the case for the de Branges--Rovnyak spaces (b). More precisely, we give an example of a non-extreme point b of the unit ball of H∞ and a function f∈(b) such that \r1-\|f\r\|\(b)=∞. It is known that, if b is a non-extreme point of the unit ball of H∞, then polynomials are dense in (b). We give the first constructive proof of this fact.