Hilbert-Schmidtness of Submodules in $H^2 (\mathbb{D}^2 )$ Containing $θ(z)−\varphi (w)$

Chao Zu; Yixin Yang; Yufeng Lu

doi:10.4208/cmr.2022-0034

Hilbert-Schmidtness of Submodules in $H^2 (\mathbb{D}^2 )$ Containing $θ(z)−\varphi (w)$

$Hilbert-Schmidtness of Submodules in $H^2 (\mathbb{D}^2 )$ Containing $θ(z)−\varphi (w)$$

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Year: 2023

Author: Chao Zu, Yixin Yang, Yufeng Lu

Communications in Mathematical Research , Vol. 39 (2023), Iss. 3 : pp. 331–341

Abstract

A closed subspace $M$ of the Hardy space $H^2(\mathbb{D}^2)$ over the bidisk is called submodule if it is invariant under multiplication by coordinate functions $z$ and $w.$ Whether every finitely generated submodule is Hilbert-Schmidt is an unsolved problem. This paper proves that every finitely generated submodule $M$ containing $θ(z)−\varphi(w)$ is Hilbert-Schmidt, where $θ(z),$ $\varphi(w)$ are two finite Blaschke products.

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Journal Article Details

Publisher Name: Global Science Press

Language: English

DOI: https://doi.org/10.4208/cmr.2022-0034

Communications in Mathematical Research , Vol. 39 (2023), Iss. 3 : pp. 331–341

Published online: 2023-01

AMS Subject Headings: Global Science Press

Pages: 11

Keywords: Hardy space over the bidisk Hilbert-Schmidt submodule fringe operator Fredholm index.

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Chao Zu

Yixin Yang

Yufeng Lu

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Hilbert-Schmidtness of Submodules in $H^2 (\mathbb{D}^2 )$ Containing $θ(z)−\varphi (w)$

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Hilbert-Schmidtness of Submodules in $H^2 (\mathbb{D}^2 )$ Containing $θ(z)−\varphi (w)$

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