Factorization of the identity through operators with large diagonal

Niels Jakob Laustsen; Richard Lechner; Paul Müller

doi:10.1016/j.jfa.2018.02.010

Factorization of the identity through operators with large diagonal

Niels Jakob Laustsen
, Richard Lechner
, Paul Müller

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

Abstract

Given a Banach space~X with an unconditional basis, we consider the following question: does the identity on~X factor through every operator on~X with large diagonal relative to the unconditional basis? We show that on Gowers' unconditional Banach space, there exists an operator for which the answer to the question is negative. By contrast, for any operator on the mixed-norm Hardy spaces Hp(Hq), where 1≤p,q<∞, with the bi-parameter Haar system, this problem always has a positive solution. The spaces Lp,1<p<∞, were treated first by Andrew (1979) [2].

Original language	English
Pages (from-to)	3169–3207
Number of pages	39
Journal	Journal of Functional Analysis
Volume	275
Issue number	11
DOIs	https://doi.org/10.1016/j.jfa.2018.02.010
Publication status	Published - 2018

Fields of science

101002 Analysis
101032 Functional analysis

JKU Focus areas

Computation in Informatics and Mathematics

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10.1016/j.jfa.2018.02.010

Cite this

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title = "Factorization of the identity through operators with large diagonal",

abstract = "Given a Banach space\textasciitilde{}X with an unconditional basis, we consider the following question: does the identity on\textasciitilde{}X factor through every operator on\textasciitilde{}X with large diagonal relative to the unconditional basis? We show that on Gowers' unconditional Banach space, there exists an operator for which the answer to the question is negative. By contrast, for any operator on the mixed-norm Hardy spaces Hp(Hq), where 1≤p,q<∞, with the bi-parameter Haar system, this problem always has a positive solution. The spaces Lp,1",

author = "Laustsen, \{Niels Jakob\} and Richard Lechner and Paul M{\"u}ller",

year = "2018",

doi = "10.1016/j.jfa.2018.02.010",

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T1 - Factorization of the identity through operators with large diagonal

AU - Laustsen, Niels Jakob

AU - Lechner, Richard

AU - Müller, Paul

PY - 2018

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N2 - Given a Banach space~X with an unconditional basis, we consider the following question: does the identity on~X factor through every operator on~X with large diagonal relative to the unconditional basis? We show that on Gowers' unconditional Banach space, there exists an operator for which the answer to the question is negative. By contrast, for any operator on the mixed-norm Hardy spaces Hp(Hq), where 1≤p,q<∞, with the bi-parameter Haar system, this problem always has a positive solution. The spaces Lp,1

AB - Given a Banach space~X with an unconditional basis, we consider the following question: does the identity on~X factor through every operator on~X with large diagonal relative to the unconditional basis? We show that on Gowers' unconditional Banach space, there exists an operator for which the answer to the question is negative. By contrast, for any operator on the mixed-norm Hardy spaces Hp(Hq), where 1≤p,q<∞, with the bi-parameter Haar system, this problem always has a positive solution. The spaces Lp,1

UR - https://www.scopus.com/pages/publications/85042933378

U2 - 10.1016/j.jfa.2018.02.010

DO - 10.1016/j.jfa.2018.02.010

M3 - Article

SN - 1096-0783

VL - 275

SP - 3169

EP - 3207

JO - Journal of Functional Analysis

JF - Journal of Functional Analysis

IS - 11

ER -

Factorization of the identity through operators with large diagonal

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