A note on simply interpolating sequences for the Dirichlet space
Abstract
We study simply interpolating sequences for the Dirichlet space in the unit disc. In particular we are interested in comparing three different sufficient conditions for simply interpolating sequences. The first one is the the so called one box condition, the second is the column bounded propererty for the associated Grammian matrix and the third one is a restricted version of the one box condition introduced by Bishop and, independently, by Marshall and Sundberg. We prove that the one box condition implies the column bounded property which in turn implies the restricted on box condition of Bishop-Marshall-Sundberg, and we give two counterexamples which show that the reverse implications fail even for weakly separated sequences.
Keywords
Cite
@article{arxiv.2111.05050,
title = {A note on simply interpolating sequences for the Dirichlet space},
author = {Nikolaos Chalmoukis},
journal= {arXiv preprint arXiv:2111.05050},
year = {2022}
}
Comments
A critical error in the proof of the converse implication in the main theorem in the first version of the paper (v1) has been spotted. We are now able to provide a counterexample for this implication