Invertibility Threshold for Nevanlinna Quotient Algebras
Abstract: Let $\mathcal{N}$ be the Nevanlinna class and let $B$ be a Blaschke product. It is shown that the natural invertibility criterion in the quotient algebra $\mathcal{N} / B \mathcal{N}$, that is, $|f| \ge e{-H} $ on the set $B{-1}{0}$ for some positive harmonic function $H$, holds if and only if the function $- \log |B|$ has a harmonic majorant on the set ${z\in\mathbb{D}:\rho(z,\Lambda)\geq e{-H(z)}}$; 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.
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