Solutions of complex differential equation having zeros on pre-given sequences

Abstract

Behavior of solutions of f''+Af=0 is discussed under the assumption that A is analytic in D and z∈D(1-|z|2)2|A(z)|<∞, where D is the unit disc of the complex plane. As a main result it is shown that such differential equation may admit a non-trivial solution whose zero-sequence does not satisfy the Blaschke condition. This gives an answer to an open question in the literature. It is also proved that ⊂D is the zero-sequence of a non-trivial solution of f''+Af=0 where |A(z)|2(1-|z|2)3\, dm(z) is a Carleson measure if and only if is uniformly separated. As an application an old result, according to which there exists a non-normal function which is uniformly locally univalent, is improved.