带rd测度的加权Morrey空间上一类算子的有界性

Pub Date : 2022-06-01 DOI:10.4208/jpde.v35.n4.7
Xiaona Cui, Yongjin Lu null, Mengmeng Li
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引用次数: 0

摘要

。本文研究了一类带加权BMO函数的次线性算子及其换向子。首先给出加权Morrey空间的定义,其中X是rd测度,ω是权函数。加权Morrey空间是研究一类偏微分方程解的局部行为而产生的。我们将证明上述一类具有加权BMO函数的算子及其交换子在加权Morrey空间L p, κµ,ω (X)中有界,只要权函数ω属于a p(µ)-类并满足逆H¨older条件。
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Boundedness for a Class of Operators on Weighted Morrey Space with RD-measure
. In this paper, we study a class of sublinear operators and their commutators with a weighted BMO function. We first give the definition of a weighted Morrey space L p , κ µ , ω ( X ) where X is an RD-measure and ω is the weight function. The weighted Morrey spaces arise from studying the local behavior of solutions to certain partial differential equations. We will show that the aforementioned class of operators and their communtators with a weighted BMO function are bounded in the weighted Morrey space L p , κ µ , ω ( X ) provided that the weight function ω belongs to the A p ( µ ) -class and satisfies the reverse H¨older’s condition.
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