Boundedness of Riesz potentials in nonhomogeneous spaces

被引:0
作者
Hu Guoen [1 ]
Meng Yan [2 ]
Yang Dachun
机构
[1] Beijing Normal Univ, Lab Math & Complex Syst, Minist Educ, Sch Math Sci, Beijing 100875, Peoples R China
[2] Renmin Univ China, Sch Informat, Beijing 100872, Peoples R China
来源
ACTA MATHEMATICA SCIENTIA | 2008年 / 28卷 / 02期
关键词
Riesz potential; Lebesgue space; Hardy space; RBMO space; boundedness; non-doubling measure;
D O I
暂无
中图分类号
O1 [数学];
学科分类号
0701 ; 070101 ;
摘要
For a class of linear operators including Riesz potentials on R(d) with a non-negative Radon measure mu, which only satisfies some growth condition, the authors prove that their boundedness in Lebesgue spaces is equivalent to their boundedness in the Hardy space or certain weak type endpoint estimates, respectively. As an application, the authors obtain several new end estimates.
引用
收藏
页码:371 / 382
页数:12
相关论文
共 12 条
[1]   Boundedness properties of fractional integral operators associated to non-doubling measures [J].
García-Cuerva, J ;
Gatto, AE .
STUDIA MATHEMATICA, 2004, 162 (03) :245-261
[2]  
García-Cuerva J, 2001, INDIANA U MATH J, V50, P1241
[3]  
GARCIACUERVA J, 1985, N HOLLAND MATH STUDI, V16
[4]   New atomic characterization of H1 space with non-doubling measures and its applications [J].
Hu, G ;
Meng, Y ;
Yang, DC .
MATHEMATICAL PROCEEDINGS OF THE CAMBRIDGE PHILOSOPHICAL SOCIETY, 2005, 138 :151-171
[5]  
Nazarov F, 1998, INT MATH RES NOTICES, V1998, P463
[6]   Painleve's problem and the semiadditivity of analytic capacity [J].
Tolsa, X .
ACTA MATHEMATICA, 2003, 190 (01) :105-149
[7]   The space H1 for nondoubling measures in terms of a grand maximal operator [J].
Tolsa, X .
TRANSACTIONS OF THE AMERICAN MATHEMATICAL SOCIETY, 2003, 355 (01) :315-348
[8]   A proof of the weak (1,1) inequality for singular integrals with non doubling measures based on a Calderon-Zygmund decomposition [J].
Tolsa, X .
PUBLICACIONS MATEMATIQUES, 2001, 45 (01) :163-174
[9]   BMO, H1, and Calderon-Zygmund operators for non doubling measures [J].
Tolsa, X .
MATHEMATISCHE ANNALEN, 2001, 319 (01) :89-149
[10]   Littlewood-Paley theory and the T(1) theorem with non-doubling measures [J].
Tolsa, X .
ADVANCES IN MATHEMATICS, 2001, 164 (01) :57-116
12