English

Blaschke products with derivative in function spaces

Complex Variables 2010-09-29 v3

Abstract

Let BB be a Blaschke product with zeros {an}\{a_n\}. If BAαpB' \in A^p_{\alpha} for certain pp and α\alpha, it is shown that n(1an)β<\sum_n (1 - |a_n|)^{\beta} < \infty for appropriate values of β\beta. Also, if {an}\{a_n\} is uniformly discrete and if BHpB' \in H^p or BA1+pB' \in A^{1+p} for any p(0,1)p \in (0,1), it is shown that n(1an)1p<\sum_n (1 - |a_n|)^{1-p} < \infty.

Cite

@article{arxiv.1001.5098,
  title  = {Blaschke products with derivative in function spaces},
  author = {David Protas},
  journal= {arXiv preprint arXiv:1001.5098},
  year   = {2010}
}

Comments

Clarified a few points. Accepted for publication in the Kodai Mathematical Journal

R2 v1 2026-06-21T14:40:31.880Z