English

Rational inner functions and their Dirichlet type norms

Complex Variables 2020-11-30 v1

Abstract

We study membership of rational inner functions in Dirichlet-type spaces in polydisks. In particular, we prove a theorem relating such inclusions to HpH^p integrability of partial derivatives of a RIF, and as a corollary we prove that all rational inner functions on Dn\mathbb{D}^n belong to D1/n,,1/n(Dn)\mathcal{D}_{1/n, \ldots ,1/n}(\mathbb{D}^n). Furthermore, we show that if 1/pDα,...,α1/p \in \mathcal{D}_{\alpha,...,\alpha}, then the RIF p~/pDα+2/n,...,α+2/n\tilde{p}/p \in \mathcal{D}_{\alpha+2/n,...,\alpha+2/n}. Finally we illustrate how these results can be applied through several examples, and how the Lojasiewicz inequality can sometimes be applied to determine inclusion of 1/p1/p in certain Dirichlet-type spaces.

Keywords

Cite

@article{arxiv.2011.13651,
  title  = {Rational inner functions and their Dirichlet type norms},
  author = {Linus Bergqvist},
  journal= {arXiv preprint arXiv:2011.13651},
  year   = {2020}
}

Comments

20 pages

R2 v1 2026-06-23T20:32:54.606Z