Interpolating with outer functions

Abstract

The classical theorems of Mittag-Leffler and Weierstrass show that when \λn\ is a sequence of distinct points in the open unit disk , with no accumulation points in , and \wn\ is any sequence of complex numbers, there is an analytic function φ on for which φ(λn) = wn. A celebrated theorem of Carleson MR117349 characterizes when, for a bounded sequence \wn\, this interpolating problem can be solved with a bounded analytic function. A theorem of Earl MR284588 goes further and shows that when Carleson's condition is satisfied, the interpolating function φ can be a constant multiple of a Blaschke product. In this paper, we explore when the interpolating φ can be an outer function. We then use our results to refine a result of McCarthy MR1065054 and explore the common range of the co-analytic Toeplitz operators on a model space.