Factorization and non-factorization theorems for pseudocontinuable functions

Abstract

Let θ be an inner function on the unit disk, and let Kpθ:=HpθHp0 be the associated star-invariant subspace of the Hardy space Hp, with p1. While a nontrivial function f∈ Kpθ is never divisible by θ, it may have a factor h which is "not too different" from θ in the sense that the ratio h/θ (or just the anti-analytic part thereof) is smooth on the circle. In this case, f is shown to have additional integrability and/or smoothness properties, much in the spirit of the Hardy--Littlewood--Sobolev embedding theorem. The appropriate norm estimates are established, and their sharpness is discussed.