ESTIMATES FOR THE MAXIMAL SINGULAR INTEGRALS WITHOUT DOUBLING CONDITION 被引量：1

ESTIMATES FOR THE MAXIMAL SINGULAR INTEGRALS WITHOUT DOUBLING CONDITION

下载PDF

导出

摘要 It is shown that the maximal singular integral operator with kernels satisfying Ho rmander＇s condition is of weak type （1,1） and L^p （1〈p〈∞） bounded without assuming that the underlying measure p is doubling. Under stronger smoothness conditions,such estimates can be obtained by using a Cotlar＇s inequality. This inequality is not applicable here and it is noticeable that the Cotlar＇s inequality maybe fails under Hormander＇s condition. It is shown that the maximal singular integral operator with kernels satisfying Ho rmander＇s condition is of weak type （1,1） and L^p （1〈p〈∞） bounded without assuming that the underlying measure p is doubling. Under stronger smoothness conditions,such estimates can be obtained by using a Cotlar＇s inequality. This inequality is not applicable here and it is noticeable that the Cotlar＇s inequality maybe fails under Hormander＇s condition.

作者 Ruan Jianmiao Zhu Xiangrong

机构地区 Dept. of Math. Dept. of Math.

出处《Applied Mathematics(A Journal of Chinese Universities)》 SCIE CSCD 2005年第4期448-454,共7页 高校应用数学学报（英文版）（B辑）

基金 Supported by the Science Foundation of the Education Department of Zhejiang Province （20050316）.

关键词 Calderon-Zygmund theory maximal singular integral nondoubling measure. Calderon-Zygmund theory,maximal singular integral ,nondoubling measure.

分类号 O172.2 [理学—基础数学]

引文网络
相关文献

参考文献14

1Nazarov F,Treil S,Volberg A.Cauchy integral and Calderon-Zygmund operators on nonhomogeneous spaces,Internat Math Res Notices,1997,15:703-726.
2Nazarov F,Treil S,Volberg A.Tb-theorem on non-homogeneous spaces,Acta Math,2003,190(2):151-239.
3Tolsa X.L2-boundedness of the Cauchy integral operator for continuous measures,Duke Math J,1999,98(2):269-304.
4Tolsa X.A T(1) theorem for non-doubling measures with atoms,Proc London Math Soc,2001,82(1):195-228.
5Tolsa X.Littlewood-Paley theory and the T(1) theorem with non-doubling measures,Adv Math,2001,164(1):57-116.
6Verdera J.On the T(1)-theorem for the Cauchy integral,Ark Mat,2000,38(1):183-199.
7Verdera J.The fall of the doubling condition in Caldeon-Zygmund theory,Proceedings of the 6th International Conference on Harmonic Analysis and Partial Differential Equations (El Escorial,2000),Publ Mat,2002,Extra:275-292.
8Nazarov F,Treil S,Volberg A.Weak type estimates and Cotlar inequalities for Calderon-Zygmund operators in nonhomogeneous spaces,Internat Math Res Notices,1998,(9):463-487.
9Tolsa X.Cotlar's inequality and existence of principal values for the Cauchy integral without doubling conditions,J Reine Angew Math,1998,502:199-235.
10Grafakos L.Estimates for maximal singular integrals,Colletc Math,2003,96:167-177.

引证文献1

1CHEN JIECHENG ZHU XIANGRONG.BOUNDEDNESS OF MAXIMAL SINGULAR INTEGRALS[J].Chinese Annals of Mathematics,Series B,2005,26(4):559-568.

1默会霞.齐型空间上的多线性Calderón-Zygmud奇异积分极大算子的有界性[J].北京师范大学学报（自然科学版）,2005,41(1):14-17.
2王荣乾,伊文坛.Cotlar不等式的一个变形及其应用[J].信息工程大学学报,2013,14(2):159-162.
3季乐文,魏文展,申守伟.Banach空间的ω-drop凸性[J].广西科学,2013,20(2):103-106. 被引量：2
4李晓今.Banach空间的一致光滑性的一个等价条件[J].广州师院学报（自然科学版）,1996,17(2):84-86. 被引量：1
5陈珠明,林宗振.局部凸空间光滑的充分条件[J].暨南大学学报（自然科学与医学版）,1996,17(1):17-23. 被引量：2
6胡国恩,孟岩.非倍测度空间上的Calderón-Zygmund算子（英文）[J].数学进展,2013,42(4):417-440.
7毕宁.一类M-进制尺度函数的光滑性[J].杭州教育学院学报,1998,2(3):7-12.
8CHEN JIECHENG ZHU XIANGRONG.BOUNDEDNESS OF MAXIMAL SINGULAR INTEGRALS[J].Chinese Annals of Mathematics,Series B,2005,26(4):559-568.
9张攀峰,戴晨峰,刘爱兵,王晋军.激励强度对等离子体合成射流的影响[J].空气动力学学报,2012,30(2):228-232. 被引量：4
10王岩青,赵中华.Jacobi方法及其推广[J].解放军理工大学学报（自然科学版）,2003,4(5):100-102. 被引量：1

Applied Mathematics(A Journal of Chinese Universities)

2005年第4期

浏览历史

内容加载中请稍等...

ESTIMATES FOR THE MAXIMAL SINGULAR INTEGRALS WITHOUT DOUBLING CONDITION 被引量：1

参考文献14

引证文献1

相关作者

相关机构

相关主题

浏览历史