对于n元连续周期函数及其共轭函数,由Γ_R(f)(x)=∫_(|y|>1)f(x-y/R)|y|^(-n-1)dy(R>0)定义的算子Γ_R在全测度集上的逼近性态被讨论且所得的结果被用来得到对于用S_R(f)(x)=sum from|m|<R to ((1-m/r)^((n-1)/2) a_m(f)e^(im...对于n元连续周期函数及其共轭函数,由Γ_R(f)(x)=∫_(|y|>1)f(x-y/R)|y|^(-n-1)dy(R>0)定义的算子Γ_R在全测度集上的逼近性态被讨论且所得的结果被用来得到对于用S_R(f)(x)=sum from|m|<R to ((1-m/r)^((n-1)/2) a_m(f)e^(imx))定义的广义Riesz平均的逼近的估计。展开更多
Letφ:R n × [0,∞) → [0,∞) be a function such that φ(x,·) is an Orlicz function and (·,t) ∈ A ∞loc (Rn) (the class of local weights introduced by Rychkov).In this paper,the authors introduce a loca...Letφ:R n × [0,∞) → [0,∞) be a function such that φ(x,·) is an Orlicz function and (·,t) ∈ A ∞loc (Rn) (the class of local weights introduced by Rychkov).In this paper,the authors introduce a local Musielak-Orlicz Hardy space hφ(Rn) by the local grand maximal function,and a local BMO-type space bmoφ(Rn) which is further proved to be the dual space of hφ(Rn).As an application,the authors prove that the class of pointwise multipliers for the local BMO-type space bmo φ (Rn),characterized by Nakai and Yabuta,is just the dual of L 1 (Rn) + h Φ 0 (Rn),where φ is an increasing function on (0,∞) satisfying some additional growth conditions and Φ 0 a Musielak-Orlicz function induced by φ.Characterizations of hφ(Rn),including the atoms,the local vertical and the local nontangential maximal functions,are presented.Using the atomic characterization,the authors prove the existence of finite atomic decompositions achieving the norm in some dense subspaces of hφ(Rn),from which,the authors further deduce some criterions for the boundedness on hφ(Rn) of some sublinear operators.Finally,the authors show that the local Riesz transforms and some pseudo-differential operators are bounded on hφ(Rn).展开更多
文摘对于n元连续周期函数及其共轭函数,由Γ_R(f)(x)=∫_(|y|>1)f(x-y/R)|y|^(-n-1)dy(R>0)定义的算子Γ_R在全测度集上的逼近性态被讨论且所得的结果被用来得到对于用S_R(f)(x)=sum from|m|<R to ((1-m/r)^((n-1)/2) a_m(f)e^(imx))定义的广义Riesz平均的逼近的估计。
基金supported by National Natural Science Foundation of China(Grant No.11171027)Program for Changjiang Scholars and Innovative Research Team in University of China
文摘Letφ:R n × [0,∞) → [0,∞) be a function such that φ(x,·) is an Orlicz function and (·,t) ∈ A ∞loc (Rn) (the class of local weights introduced by Rychkov).In this paper,the authors introduce a local Musielak-Orlicz Hardy space hφ(Rn) by the local grand maximal function,and a local BMO-type space bmoφ(Rn) which is further proved to be the dual space of hφ(Rn).As an application,the authors prove that the class of pointwise multipliers for the local BMO-type space bmo φ (Rn),characterized by Nakai and Yabuta,is just the dual of L 1 (Rn) + h Φ 0 (Rn),where φ is an increasing function on (0,∞) satisfying some additional growth conditions and Φ 0 a Musielak-Orlicz function induced by φ.Characterizations of hφ(Rn),including the atoms,the local vertical and the local nontangential maximal functions,are presented.Using the atomic characterization,the authors prove the existence of finite atomic decompositions achieving the norm in some dense subspaces of hφ(Rn),from which,the authors further deduce some criterions for the boundedness on hφ(Rn) of some sublinear operators.Finally,the authors show that the local Riesz transforms and some pseudo-differential operators are bounded on hφ(Rn).