Factorization of solutions of linear differential equations

Abstract

This paper supplements recents results on linear differential equations f''+Af=0, where the coefficient A is analytic in the unit disc of the complex plane C. It is shown that, if A is analytic and |A(z)|2(1-|z|2)3\, dm(z) is a Carleson measure, then all non-trivial solutions of f''+Af=0 can be factorized as f=Beg, where B is a Blaschke product whose zero-sequence is uniformly separated and where g∈ BMOA satisfies the interpolation property g'(zn) = -12 \, B''(zn)B'(zn), zn∈. Among other things, this factorization implies that all solutions of f''+Af=0 are functions in a Hardy space and have no singular inner factors. Zero-free solutions play an important role as their maximal growth is similar to the general case. The study of zero-free solutions produces a new result on Riccati differential equations.