English

Hilbert matrix operator on bound analytic functions

Functional Analysis 2024-10-25 v1 Complex Variables

Abstract

It is well known that the Hilbert matrix operator H\mathcal {H} is bounded from HH^{\infty} to the mean Lipschitz spaces Λ1pp\Lambda^{p}_{\frac{1}{p}} for all 1<p<1<p<\infty. In this paper, we prove that the range of Hilbert matrix operator H\mathcal {H} acting on HH^{\infty} is contained in certain Zygmund-type space (denoted by Λ11.\Lambda^{1.*}_{1}), which is strictly smaller than p>1Λ1pp\cap_{p>1}\Lambda^{p}_{\frac{1}{p}}. We also provide explicit upper and lower bounds for the norm of the Hilbert matrix H\mathcal {H} acting from HH^{\infty} to Λ11.\Lambda^{1.*}_{1}. Additionally, we also characterize the positive Borel measures μ\mu such that the generalized Hilbert matrix operator Hμ\mathcal {H}_{\mu} is bounded from HH^{\infty} to the Hardy space HqH^{q}. This part is a continuation of the work of Chatzifountas, Girela and Pel\'{a}ez [J. Math. Anal. Appl. 413 (2014) 154--168] regarding Hμ\mathcal {H}_{\mu} on Hardy spaces.

Keywords

Cite

@article{arxiv.2410.18682,
  title  = {Hilbert matrix operator on bound analytic functions},
  author = {Yuting Guo and Pengcheng Tang},
  journal= {arXiv preprint arXiv:2410.18682},
  year   = {2024}
}
R2 v1 2026-06-28T19:34:11.850Z