Changyong Zhong scite author profile

Changyong Zhong

4Publications

102Citation Statements Received

90Citation Statements Given

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104

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Sichuan University

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Multiplication operators on the Bergman space via the Hardy space of the bidisk

Guo¹,

Sun²,

Zheng³

et al. 2009

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Abstract. In this paper, we develop a machinery to study multiplication operators on the Bergman space via the Hardy space of the bidisk. Using the machinery we study the structure of reducing subspaces of a multiplication operator on the Bergman space. As a consequence, we completely classify reducing subspaces of the multiplication operator by a Blaschke product φ with order three on the Bergman space to solve a conjecture of Zhu [40].

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Classification of Reducing Subspaces of a Class of Multiplication Operators on the Bergman Space via the Hardy Space of the Bidisk

Sun¹,

Zheng²,

Zhong³

2010

Can. j. math.

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$m$-Berezin transform and compact operators

Nam¹,

Zheng²,

Zhong³

2006

Rev. Mat. Iberoam.

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ABSTRACT. m-Berezin transforms are introduced for bounded operators on the Bergman space of the unit ball. The norm of the m-Berezin transform as a linear operator from the space of bounded operators to L ∞ is found. We show that the m-Berezin transforms are commuting with each other and Lipschitz with respect to the pseudo-hyperbolic distance on the unit ball. Using the mBerezin transforms we show that a radial operator in the Toeplitz algebra is compact iff its Berezin transform vanishes on the boundary of the unit ball.

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Collectively Compact Hankel Operator Sequences on Hardy Spaces

Cao

Zhong

1997

Journal of Mathematical Analysis and Applications

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Changyong Zhong

Multiplication operators on the Bergman space via the Hardy space of the bidisk

Classification of Reducing Subspaces of a Class of Multiplication Operators on the Bergman Space via the Hardy Space of the Bidisk

$m$-Berezin transform and compact operators

Collectively Compact Hankel Operator Sequences on Hardy Spaces

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