与薛定谔算子相关的极大Riesz变换从BMO_(L,ω)到BLO_(L,ω)的有界性（英文）

Maximal Riesz Transforms Acting from BMO_(L,ω) to BLO_(L,ω) in the Schrodinger Settings

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摘要本文介绍了一类加权BLO_(L,ω)空间,并且得到了与薛定谔算子相关的极大Riesz变换是从BMO_(L,ω)空间到BLO_(L,ω)空间上的有界性结果. In this paper, we introduce a new type of weighted BLO ,ω spaces associated to a Schrodinger operator with a weight ω∩ App^p,∞（R^n）. With this we establish the boundedness of maximal -Riesz transforms from BMO ,ω to BLO ,ω.

作者刘静 LIU Jing(Yili Vocational and Technical College, Yining, Xinjiang, 835000, P. R. Chin)

机构地区伊犁职业技术学院

出处《数学进展》 CSCD 北大核心 2018年第4期553-566,共14页 Advances in Mathematics（China）

关键词 BMOL ω空间 BLOL ω空间薛定谔算子 BMOL,ω spaces BLOL,ω spaces schrodinger operator

分类号 O174.2 [理学—数学]

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共引文献3

1ZHU Hua,ZHANG Qian.bmo _ρ(ω) Spaces and Riesz transforms associated to Schrdinger operators[J].Science China Mathematics,2016,59(10):1995-2018. 被引量：3
2FAN XingYa,HE JianXun,LI BaoDe,YANG DaChun.Real-variable characterizations of anisotropic product Musielak-Orlicz Hardy spaces[J].Science China Mathematics,2017,60(11):2093-2154. 被引量：5
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与薛定谔算子相关的极大Riesz变换从BMO_(L,ω)到BLO_(L,ω)的有界性（英文）

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