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Creators/Authors contains: "Huo, Zhenghui"

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  1. ; (, Canadian Journal of Mathematics)
    Abstract We study the$$L^p$$regularity of the Bergman projectionPover the symmetrized polydisc in$$\mathbb C^n$$. We give a decomposition of the Bergman projection on the polydisc and obtain an operator equivalent to the Bergman projection over antisymmetric function spaces. Using it, we obtain the$$L^p$$irregularity ofPfor$$p=\frac {2n}{n-1}$$which also implies thatPis$$L^p$$bounded if and only if$$p\in (\frac {2n}{n+1},\frac {2n}{n-1})$$. 
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  2. ; ; (, Bulletin des Sciences Mathématiques)
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  3. ; ; (, The Journal of Geometric Analysis)
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  4. ; (, Journal of Functional Analysis)
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  5. (, Journal of operator theory)
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  6. ; (, Bulletin of the London Mathematical Society)