Wavelet approach to operator-valued Hardy spaces

Guixiang Hong; Zhi Yin

doi:10.4171/rmi/720

Wavelet approach to operator-valued Hardy spaces

Guixiang Hong^*
, Zhi Yin

^*Corresponding author for this work

CNRS
Wuhan University

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

7 Scopus citations

Abstract

This paper is devoted to the study of operator-valued Hardy spaces via the wavelet method. This approach is parallel to that in the noncommutative martingale case. We show that our Hardy spaces defined by wavelets coincide with those introduced by Tao Mei via the usual Lusin and Littlewood-Paley square functions. As a consequence, we give an explicit complete unconditional basis of the Hardy space H₁(R) when H₁(R) is equipped with an appropriate operator space structure.

Original language	English
Pages (from-to)	293-313
Number of pages	21
Journal	Revista Matematica Iberoamericana
Volume	29
Issue number	1
DOIs	https://doi.org/10.4171/rmi/720
State	Published - 2013
Externally published	Yes

Keywords

BMO spaces
Duality
Hardy spaces
Interpolation
Wavelets

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10.4171/rmi/720

Cite this

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abstract = "This paper is devoted to the study of operator-valued Hardy spaces via the wavelet method. This approach is parallel to that in the noncommutative martingale case. We show that our Hardy spaces defined by wavelets coincide with those introduced by Tao Mei via the usual Lusin and Littlewood-Paley square functions. As a consequence, we give an explicit complete unconditional basis of the Hardy space H1(R) when H1(R) is equipped with an appropriate operator space structure.",

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AB - This paper is devoted to the study of operator-valued Hardy spaces via the wavelet method. This approach is parallel to that in the noncommutative martingale case. We show that our Hardy spaces defined by wavelets coincide with those introduced by Tao Mei via the usual Lusin and Littlewood-Paley square functions. As a consequence, we give an explicit complete unconditional basis of the Hardy space H1(R) when H1(R) is equipped with an appropriate operator space structure.

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KW - Duality

KW - Hardy spaces

KW - Interpolation

KW - Wavelets

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Wavelet approach to operator-valued Hardy spaces

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Keywords

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