Point evaluation and Hardy space on a homogeneous tree

Daniel Alpay; Dan Volok

doi:10.1007/s00020-003-1302-4

Point evaluation and Hardy space on a homogeneous tree

Daniel Alpay
, Dan Volok

Department of Mathematics

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

15 Scopus citations

Abstract

We consider stationary multiscale systems as defined by Basseville, Benveniste, Nikoukhah and Willsky. We show that there are deep analogies with the discrete time non stationary setting as developed by the first author, Dewilde and Dym. Following these analogies we define a point evaluation with values in a C*-algebra and the corresponding "Hardy space" in which Cauchy's formula holds. This point evaluation is used to define in this context the counterpart of classical notions such as Blaschke factors.

Original language	English
Pages (from-to)	1-22
Number of pages	22
Journal	Integral Equations and Operator Theory
Volume	53
Issue number	1
DOIs	https://doi.org/10.1007/s00020-003-1302-4
State	Published - 1 Sep 2005

Keywords

Hilbert module
Homogeneous tree
System realization

ASJC Scopus subject areas

Analysis
Algebra and Number Theory

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10.1007/s00020-003-1302-4

Cite this

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AB - We consider stationary multiscale systems as defined by Basseville, Benveniste, Nikoukhah and Willsky. We show that there are deep analogies with the discrete time non stationary setting as developed by the first author, Dewilde and Dym. Following these analogies we define a point evaluation with values in a C*-algebra and the corresponding "Hardy space" in which Cauchy's formula holds. This point evaluation is used to define in this context the counterpart of classical notions such as Blaschke factors.

KW - Hilbert module

KW - Homogeneous tree

KW - System realization

UR - https://www.scopus.com/pages/publications/24944485861

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M3 - Article

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JO - Integral Equations and Operator Theory

JF - Integral Equations and Operator Theory

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ER -

Point evaluation and Hardy space on a homogeneous tree

Abstract

Keywords

ASJC Scopus subject areas

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