1) Carleson type measure
Carleson型测度
1.
We characterize Bloch type functions by higher radial derivative and obtain their characteristic of Carleson type measure.
用高阶径向导数刻画了Bloch型函数,得到了Bloch型函数关于Carleson型测度的特征。
2) Carleson measure
Carleson测度
1.
Inequality to describe double Carleson measure and description of Carleson inverse inequality;
双Carleson测度的积分不等式及对Carleson逆不等式的刻画
2.
Carleson measure and Carleson measure in weighted Bergman space;
Carleson测度与加权Bergman空间上的Carleson测度
3.
The bounded property of a operator and the description of Carleson measure with BMO_ function;
算子有界性及BMO_函数对Carleson测度的刻画
4) K-Carleson measure
K-Carleson测度
1.
In this paper,we use K-Carleson measure to discuss the bounded composition operators from Bα(Bα0) to QK and the bounded and compact composition operators from Bα to QK,0.
用K-Carleson测度刻画了Bα(B0α)到QK的复合算子的有界性,以及Bα到QK,0的复合算子的有界性和紧性。
2.
The second part of the paper gives the distance formulas from Bloch functions to some Q_K-type spaces,which are characterized by using the K-Carleson measure.
第二部分利用K-Carleson测度刻划出了Bloch函数到Q_K型函数空间的距离,其中包含本文的主要定理及其证明。
5) η-Carleson measure
η-Carleson测度
1.
Some sufficient and necessary conditions for the composition operators between different Privalov spaces and different weighted Bergman-Privalov spaces to be metrically bounded or metrically compact are given by usingη-Carleson measure, and some function theoretic characterizations are also given.
利用η-Carleson测度给出了单位球上不同Privalov以及不同加权Bergman-Privalov空间之间的复合算子是度量有界或度量紧的充要条件,并给出了一些函数理论方面的刻画。
6) q-carleson measure
q-Carleson测度
补充资料:Carleson定理
Carleson定理
Carieson theorem
C州e油定理l〔油de姗the侧rem;地恻1.以”Ia联恻阵Mal L:(0,2劝中函数的Fourier三角级数几乎处处收敛.这一定理是由H.H.月邓朋作为猜测提出(【l]),而由L.Carleson证明的(【21).当P>l时,Carleson定理的结论对于空间L,中的函数仍成立(见【3]).但当p二1时,定理的结论不成立,这个事实由AH.K~ropoB构造的例子所证明([41),该例子是一个Ll中的函数,其Fourier三角级数几乎处处发散.【补注】由[31的缘故,这个定理也称为Carleson-Hunt牢浮(Carleson一Hunt theorem)(见[A3],其中探刻地阐述了这个定理). 在[4〕发表后几年,K~ropoB又证明了:存在一个L.中的函数,它的Fourier三角级数处处发散(【All).
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