AbstractIn this paper, we use the idea of the discrete Littlewood–Paley theory developed by Han and Lu to carry out the three-parameter weighted Hardy spaces theory under a rather weak condition on the product weight (w∈A∞) and obtain the boundedness of singular integral operators on the weighted Hardy spaces
This thesis deals with various generalizations of two famous inequalities namely the Hardy inequalit...
The boundedness of operators on Hardy spaces is usually given by atomic decomposition. In this paper...
The authors prove that the parametrized area integral and function are bounded from the weighted ...
AbstractIn this paper, we use the idea of the discrete Littlewood–Paley theory developed by Han and ...
summary:Applying discrete Calderón's identity, we study weighted multi-parameter mixed Hardy space $...
AbstractIn this paper, we will characterize the weighted Hardy spaces by the intrinsic square functi...
In this paper we give quantitative bounds for the norms of different kinds of singular integral oper...
These notes give the basic ingredients of the theory of weighted Hardy spaces of tempered distributi...
AbstractIn this paper, applying the atomic decomposition and molecular characterization of the real ...
Operator theory studied by very mathematicians, we refer to [1,2,3,4,5]. Compactification of weight...
The matrix Ap condition extends several results in weighted norm theory to functions taking values i...
We present factorizations of weighted Lebesgue, Cesàro and Copson spaces, for weights satisfying the...
AbstractIn this paper, the maximal operator associated with multilinear Calderón–Zygmund singular in...
AbstractWe prove some weighted estimates for certain Littlewood–Paley operators on the weighted Hard...
Boundedness of a fundamental Hardy-type operator with a kernel is characterized between weighted Leb...
This thesis deals with various generalizations of two famous inequalities namely the Hardy inequalit...
The boundedness of operators on Hardy spaces is usually given by atomic decomposition. In this paper...
The authors prove that the parametrized area integral and function are bounded from the weighted ...
AbstractIn this paper, we use the idea of the discrete Littlewood–Paley theory developed by Han and ...
summary:Applying discrete Calderón's identity, we study weighted multi-parameter mixed Hardy space $...
AbstractIn this paper, we will characterize the weighted Hardy spaces by the intrinsic square functi...
In this paper we give quantitative bounds for the norms of different kinds of singular integral oper...
These notes give the basic ingredients of the theory of weighted Hardy spaces of tempered distributi...
AbstractIn this paper, applying the atomic decomposition and molecular characterization of the real ...
Operator theory studied by very mathematicians, we refer to [1,2,3,4,5]. Compactification of weight...
The matrix Ap condition extends several results in weighted norm theory to functions taking values i...
We present factorizations of weighted Lebesgue, Cesàro and Copson spaces, for weights satisfying the...
AbstractIn this paper, the maximal operator associated with multilinear Calderón–Zygmund singular in...
AbstractWe prove some weighted estimates for certain Littlewood–Paley operators on the weighted Hard...
Boundedness of a fundamental Hardy-type operator with a kernel is characterized between weighted Leb...
This thesis deals with various generalizations of two famous inequalities namely the Hardy inequalit...
The boundedness of operators on Hardy spaces is usually given by atomic decomposition. In this paper...
The authors prove that the parametrized area integral and function are bounded from the weighted ...
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