THREE RADII ASSOCIATED TO SCHUR FUNCTIONS ON THE POLYDISK

Greg Knese

doi:10.1090/bproc/262

THREE RADII ASSOCIATED TO SCHUR FUNCTIONS ON THE POLYDISK

Greg Knese

Department of Mathematics

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

1 Scopus citations

Abstract

This article examines three radii associated to bounded analytic functions on the polydisk: the well-known Bohr radius, the Bohr-Agler radius, and the Schur-Agler radius. We prove explicit upper and lower bounds for the Bohr-Agler radius, an explicit lower bound for the Schur-Agler radius, and an asymptotic upper bound for the Schur-Agler radius. The Bohr-Agler radius obeys the same (known) asymptotic as the Bohr radius while we show the Schur-Agler radius is roughly of the same growth as the Bohr radius. As a corollary, we bound the Bohr radius on the bidisk below by 0.3006. Finally, we improve some estimates of P. G. Dixon on Agler norms of homogeneous polynomials using some modern inequalities.

Original language	English
Pages (from-to)	48-63
Number of pages	16
Journal	Proceedings of the American Mathematical Society, Series B
Volume	12
Issue number	1
DOIs	https://doi.org/10.1090/bproc/262
State	Published - 2025

Keywords

Agler class
Bohnenblust-Hille inequality
Bohr radius
Schur class
Schur-Agler class
absolute convergence
polarization
transfer function realization
von Neumann’s inequality

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10.1090/bproc/262

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title = "THREE RADII ASSOCIATED TO SCHUR FUNCTIONS ON THE POLYDISK",

abstract = "This article examines three radii associated to bounded analytic functions on the polydisk: the well-known Bohr radius, the Bohr-Agler radius, and the Schur-Agler radius. We prove explicit upper and lower bounds for the Bohr-Agler radius, an explicit lower bound for the Schur-Agler radius, and an asymptotic upper bound for the Schur-Agler radius. The Bohr-Agler radius obeys the same (known) asymptotic as the Bohr radius while we show the Schur-Agler radius is roughly of the same growth as the Bohr radius. As a corollary, we bound the Bohr radius on the bidisk below by 0.3006. Finally, we improve some estimates of P. G. Dixon on Agler norms of homogeneous polynomials using some modern inequalities.",

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journal = "Proceedings of the American Mathematical Society, Series B",

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AB - This article examines three radii associated to bounded analytic functions on the polydisk: the well-known Bohr radius, the Bohr-Agler radius, and the Schur-Agler radius. We prove explicit upper and lower bounds for the Bohr-Agler radius, an explicit lower bound for the Schur-Agler radius, and an asymptotic upper bound for the Schur-Agler radius. The Bohr-Agler radius obeys the same (known) asymptotic as the Bohr radius while we show the Schur-Agler radius is roughly of the same growth as the Bohr radius. As a corollary, we bound the Bohr radius on the bidisk below by 0.3006. Finally, we improve some estimates of P. G. Dixon on Agler norms of homogeneous polynomials using some modern inequalities.

KW - Agler class

KW - Bohnenblust-Hille inequality

KW - Bohr radius

KW - Schur class

KW - Schur-Agler class

KW - absolute convergence

KW - polarization

KW - transfer function realization

KW - von Neumann’s inequality

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DO - 10.1090/bproc/262

M3 - Article

AN - SCOPUS:105007190466

SN - 2330-1511

VL - 12

SP - 48

EP - 63

JO - Proceedings of the American Mathematical Society, Series B

JF - Proceedings of the American Mathematical Society, Series B

IS - 1

ER -

THREE RADII ASSOCIATED TO SCHUR FUNCTIONS ON THE POLYDISK

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Keywords

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