A free interpolation problem for a subspace of H∞

Abstract

Given an inner function θ, the associated star-invariant subspace K∞θ is formed by the functions f∈ H∞ that annihilate (with respect to the usual pairing) the shift-invariant subspace θ H1 of the Hardy space H1. Assuming that B is an interpolating Blaschke product with zeros \aj\, we characterize the traces of functions from K∞B on the sequence \aj\. The trace space that arises is, in general, non-ideal (i.e., the sequences \wj\ belonging to it admit no nice description in terms of the size of |wj|), but we do point out explicit -- and sharp -- size conditions on |wj| which make it possible to solve the interpolation problem f(aj)=wj (j=1,2,…) with a function f∈ K∞B.