Inner functions and de Branges functions

Abstract

A necessary and sufficient condition for an inner function F in the upper half-plane (UHP) to satisfy F = E*/E where E is a de Branges function is presented. Since FE =E*/E is an inner function for any de Branges function E, and the map that takes f to f/E is an isometry of the de Branges space H(E) onto S(FE), the orthogonal complement of FE H2, there is a natural bijective correspondence between de Branges spaces of entire functions and the set of subspaces S(F), for which F= E*/E for some de Branges function E. Under the canonical isometry of H2(UHP) onto H2(D) the subspaces S(FE) become certain invariant subspaces for the backwards shift in H2(D). I have been informed that the results contained in this paper are not new. Most of the results in this paper can be found, for example, in Theorem 2.7, Section 2.8, and Lemma 2.1 of V. Havin and J. Mashregi, "Admissable majorants for model spaces of H2, Part I: slow winding of the generating inner function", Canad. J. Math. Vol. 55 (6), 2003 pp. 12311263. For this reason I have withdrawn this article.