Factoring derivatives of functions in the Nevanlinna and Smirnov classes

Abstract

We prove that, given a function f in the Nevanlinna class N and a positive integer n, there exist g∈ N and h∈ BMOA such that f(n)=gh(n). We may choose g to be zero-free, so it follows that the zero sets for the class N(n):=\f(n): f∈ N\ are the same as those for BMOA(n). Furthermore, while the set of all products gh(n) (with g and h as above) is strictly larger than N(n), we show that the gap is not too large, at least when n=1. Precisely speaking, the class \gh': g∈ N, h∈ BMOA\ turns out to be the smallest ideal space containing \f': f∈ N\, where "ideal" means invariant under multiplication by H∞ functions. Similar results are established for the Smirnov class N+.