In this article, we characterize the boundedness and compactness of extended Cesaro operators on the spaces BMOA by the Carleson measures in the unit ball. Mea while, we study the pointwise multipliers on BMOA.
In this article, we borrow the idea of using Schur's test to characterize the compactness of composition operators on the weighted Bergman spaces in a bounded symmetricdomain Ω and verify that Cφ is compact on Lqa...In this article, we borrow the idea of using Schur's test to characterize the compactness of composition operators on the weighted Bergman spaces in a bounded symmetricdomain Ω and verify that Cφ is compact on Lqa(Ω,dvβ)if and only if K(φ(z),φ(z))/K(z,z)→0 as z→ Ω under a mild condition,where K(z,w)is the Bergman kernel.展开更多
Let H(B) be the set of all harmonic functions f on the unit ball B of Rn. For 0 p, q ≤ ∞ and a normal weight φ, the mixed norm space Hp,q, φ(B) consists of all functions f in H(B) for which the mixed norm p,...Let H(B) be the set of all harmonic functions f on the unit ball B of Rn. For 0 p, q ≤ ∞ and a normal weight φ, the mixed norm space Hp,q, φ(B) consists of all functions f in H(B) for which the mixed norm p,q, φ ∞. In this article, we obtain some characterizations in terms of radial, tangential, and partial derivative norms in Hp,q, φ(B). The parallel results for the Bloch-type space are also obtained. As an application, the analogous problems for polyharmonic functions are discussed.展开更多
基金National Natural Science Foundation of China (10471039) Natural Science Foundation of ZhejiangProvince( M103104 ,Y606197)Natural Science Foundation of Huzhou City (2005YZ02)
基金National Natural Science Foundation of China(11771139)National Natural Science Foundation of Zhejiang Province(LY20A010008)“Xinmiao”Projection for the undergraduate students of Zhejiang Province(2019R431003).
基金supported by the National Natural Science Foundation of China(10771064,11101139)Natural Science Foundation of Zhejiang province (Y7080197,Y6090036,Y6100219)Foundation of Creative Group in Universities of Zhejiang Province (T200924)
文摘In this article, we characterize the boundedness and compactness of extended Cesaro operators on the spaces BMOA by the Carleson measures in the unit ball. Mea while, we study the pointwise multipliers on BMOA.
基金Supported by the National Natural Science Foundation of China (10771064)Natural Science Foundation of Zhejiang Province (Y7080197, Y6090036, Y6100219)+1 种基金Foundation of Creative Group in Colleges and Universities of Zhejiang Province (T200924)Foundation of Department of Education of Zhejiang province (20070482)
文摘In this article, we borrow the idea of using Schur's test to characterize the compactness of composition operators on the weighted Bergman spaces in a bounded symmetricdomain Ω and verify that Cφ is compact on Lqa(Ω,dvβ)if and only if K(φ(z),φ(z))/K(z,z)→0 as z→ Ω under a mild condition,where K(z,w)is the Bergman kernel.
基金Supported by the NNSF of China (10771064,10971063)the NSF of Zhejiang Province (Y6100219, Y7080197, Y6090036, D7080080)the Innovation Team Foundation of the Department of Education of Zhejiang Province (T200924)
文摘Let H(B) be the set of all harmonic functions f on the unit ball B of Rn. For 0 p, q ≤ ∞ and a normal weight φ, the mixed norm space Hp,q, φ(B) consists of all functions f in H(B) for which the mixed norm p,q, φ ∞. In this article, we obtain some characterizations in terms of radial, tangential, and partial derivative norms in Hp,q, φ(B). The parallel results for the Bloch-type space are also obtained. As an application, the analogous problems for polyharmonic functions are discussed.
基金National Natural Science Foundation of China(10771064)Natural Science Foundation of Zhejiang Province(Y7080197,Y6090036)+1 种基金Characteristic Subject of China"Mathematics and applied mathematics",Delicate Course of China"theory of functions of a complex variable",Educational Innovation of Zhejiang province(yb07109)Foundation of Creative Group in Colleges and Universities of Zhejiang Province(T200924)
基金Project supported by the NSFC(No.10771064)the National Natural Science Foundation of Zhejiang Province(No.Y6090036,No.Y606197,No.Y7080197)the Foundation of Department of Education of Zhejiang Province(No.20070482)