Simply interpolating and Carleson sequences for Hardy spaces in the polydisc

Nikolaos Chalmoukis; Alberto Dayan

doi:10.1007/s12220-025-02155-5

Simply interpolating and Carleson sequences for Hardy spaces in the polydisc

Nikolaos Chalmoukis, Alberto Dayan^*

^*Corresponding author for this work

Research output: Contribution to journal › Article › Research › peer-review

Abstract

We study the relation between simply and universally interpolating sequences for the holomorphic Hardy spaces Hp(Dd) on the polydisc. In dimension d=1 a sequence is simply interpolating if and only if it is universally interpolating, due to a classical theorem of Shapiro and Shields. In dimension d≥2, Amar showed that Shapiro and Shields’ theorem holds for Hp(Dd) when p≥4. In contrast, we show that if 1≤p≤2 there exist simply interpolating sequences which are not universally interpolating.

Original language	English
Article number	319
Journal	Journal of Geometric Analysis
Volume	35
Issue number	10
DOIs	https://doi.org/10.1007/s12220-025-02155-5
Publication status	Published - Oct 2025
Externally published	Yes

Keywords

Bidisc
Carleson-Newmann sequences
Holomorphic Hardy spaces
Polydisc
Simply interpolating sequences
Universally interpolating sequences

Access to Document

10.1007/s12220-025-02155-5

Cite this

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title = "Simply interpolating and Carleson sequences for Hardy spaces in the polydisc",

abstract = "We study the relation between simply and universally interpolating sequences for the holomorphic Hardy spaces Hp(Dd) on the polydisc. In dimension d=1 a sequence is simply interpolating if and only if it is universally interpolating, due to a classical theorem of Shapiro and Shields. In dimension d≥2, Amar showed that Shapiro and Shields{\textquoteright} theorem holds for Hp(Dd) when p≥4. In contrast, we show that if 1≤p≤2 there exist simply interpolating sequences which are not universally interpolating.",

keywords = "Bidisc, Carleson-Newmann sequences, Holomorphic Hardy spaces, Polydisc, Simply interpolating sequences, Universally interpolating sequences",

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AU - Dayan, Alberto

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N2 - We study the relation between simply and universally interpolating sequences for the holomorphic Hardy spaces Hp(Dd) on the polydisc. In dimension d=1 a sequence is simply interpolating if and only if it is universally interpolating, due to a classical theorem of Shapiro and Shields. In dimension d≥2, Amar showed that Shapiro and Shields’ theorem holds for Hp(Dd) when p≥4. In contrast, we show that if 1≤p≤2 there exist simply interpolating sequences which are not universally interpolating.

AB - We study the relation between simply and universally interpolating sequences for the holomorphic Hardy spaces Hp(Dd) on the polydisc. In dimension d=1 a sequence is simply interpolating if and only if it is universally interpolating, due to a classical theorem of Shapiro and Shields. In dimension d≥2, Amar showed that Shapiro and Shields’ theorem holds for Hp(Dd) when p≥4. In contrast, we show that if 1≤p≤2 there exist simply interpolating sequences which are not universally interpolating.

KW - Bidisc

KW - Carleson-Newmann sequences

KW - Holomorphic Hardy spaces

KW - Polydisc

KW - Simply interpolating sequences

KW - Universally interpolating sequences

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