Invertibility Threshold for Nevanlinna Quotient Algebras

Abstract

Let N be the Nevanlinna class and let B be a Blaschke product. It is shown that the natural invertibility criterion in the quotient algebra N / B N, that is, |f| e-H on the set B-1\0\ for some positive harmonic function H, holds if and only if the function - |B| has a harmonic majorant on the set \z∈D:(z,)≥ e-H(z)\; at least for large enough functions H. We also study the corresponding class of positive harmonic functions H in the unit disc such that the latter condition holds. We also discuss the analogous invertibility problem in quotients of the Smirnov class.