齐型空间,Space of homogeneous type
1)Space of homogeneous type齐型空间
1.Exponential integrelity for maximal singular integral on space of homogeneous type;齐型空间上极大奇异积分的指数可积性
2.A weighted weak type endpoint estimate with Ap weights is established for the commutators of singular integral operators in the space of homogeneous type.文章研究Coifman-Weiss意义下齐型空间上奇异积分算子与BMO函数的交换子,利用Aimar的分解定理,建立了交换子的弱端点估计,推广和改进了此前的有关结论。
3.In this paper,by using the equivalent difinition of homogeneous Herz-Morrey space in the space of homogeneous type,we study the boundedness of commutator of fractional integral operator on this space.本文利用齐型空间中齐次Herz-Morrey空间的等价定义,研究了分数次积分算子交换子在此空间上的有界性。
英文短句/例句
1.The Spaces of Lipschitz and Commutators on Spaces of Homogeneous Type;齐型空间上的Lipschitz空间及交换子
2.Boundedness of Fractional Multilinear Commutators on Homogeneous Morrey-Herz Space with Non-doubling Measures非齐型空间上齐次Morrey-Herz空间中分数次多线性交换子的有界性
3.Boundedness of Operators on Herz Spaces of the Homogeneous Spaces;齐型空间上Herz空间中的一些算子的连续性
4.Multilinear Calderon-Zygmund Operator on Space of Homogeneous Type;齐型空间上的多线性Calderon-Zygmund算子
5.Endpoint Estimates for the Commutators of Singular Integral Operators on Spaces of Homogeneous Type;齐型空间上奇异积分算子交换子的端点估计
6.Weighted Rearrangement Inequality on Spaces of Homogeneous Type and Application齐型空间上的加权重排不等式及其应用
7.The Boundedness of Bilinear Commutators of Singular Integral Operators on Spaces of Homogeneous Type齐型空间上奇异积分双线性交换子的有界性
8.Weighted Valuable Maximal Inequalities of Fefferman-Stein on Non-Homogeneous Spaces非齐型空间上Fefferman-Stein加权向量值极大不等式
9.A Cotlar Type Inequalities for Commutators of Singular Integral Operators on Spaces of Homogenous Type and Its Application齐型空间上奇异积分算子交换子的Cotlar型不等式及其应用
10.Weighted Weak Type Estimates for Commutators of Fractional Integrals on Spaces of Homogeneous Type齐型空间上的分数次积分交换子的加权弱型估计
11.Endpoint Estimates for Commutator of Fractional Integral on Space of Homogeneous Type分数次积分变换的交换子在齐型空间上的端点估计
12.WEIGHTED BOUNDEDNESS OF BILINEAR C-Z SINGULAR INTEGRAL OPERATORS ON SPACE OF HOMOGENEOUS TYPE齐型空间上双线性C-Z奇异积分算子的加权有界性
13.A Two-weight Norm Inequality for Singular Integral Operators with Non-smooth Kernel on Spaces of Homogeneous Type齐型空间上带非光滑核的奇异积分算子的双权不等式
14.The Proper Action of a Reductive Lie Group on the Homogeneous Space of Reductive Type;约化群对约化型齐性空间的proper作用
15.Boundedness of some sublinear operators and commutators on homogeneous Morrey-Herz spaces with non doubling measures非齐型齐次Morrey-Herz空间中某些次线性算子和交换子的有界性
16.Boundedness of Some Higher-Order Commutators on Morrey-Herz Spaces Without Doubling Conditions非双倍测度下一类高阶交换子在非齐型齐次Morrey-Herz空间上的有界性
17.Boundedness of Parametric Marcinkiewicz Integrals with Variable Kernels on Homogeneous Morrey-Herz Spaces参数型Marcinkiewicz积分在齐次Morrey-Herz空间上的有界性
18.Boundedness of some Commutators on Non-homogeneous Herz Space一类交换子在非齐型Herz空间中的有界性
相关短句/例句
spaces of homogeneous type齐型空间
1.Boundedness of commutators onspaces of homogeneous type;齐型空间上两类交换子的有界性
2.In this paper,we give the boundness of fractional maximal operator on Herz spaces onspaces of homogeneous type: Let 0<s<1,0<α<1-1/q1,1<q1<1/s,1/q2=1/q1-s and 0<p1≤p2<∞,then Ms is a bounded operator from Kα,p1q1(X) to Kα,p2q2(X).本文主要给出了分数次极大算子在齐型空间上Herz空间中的有界性:设0 3)homogeneous space齐型空间 1.Boundedness of maximal operators in Morrey-type spaces onhomogeneous spaces;齐型空间上Morrey型空间中极大算子的有界特征 2.On the existence and Lipschitz boundedness of maximal operator onhomogeneous spaces.;齐型空间上极大函数的存在性和Lipschitz有界性 3.A kind of singular integral operators onhomogeneous spaces are defined.在齐型空间上定义了一类广义奇异积分算子,证明了该算子的加权Φ有界性,这里Φ是Young函数,同时给出了它的一些应用。 4)homogeneous type space齐型空间 1.Let X thehomogeneous type space,Φ be a Young function,suppose that sublinear operator is bounded from T LΦ(X,ω) to LΦ(X+,β),then it holds that is weighted and bounded from generalized Orlicz-Campanato space T LΦ,φ(X,ω) to LΦ,φ(X +,β).设X是齐型空间,Φ为Young函数,并设次线性算子T是从LΦ(X,ω)到LΦ(X+,β)有界的。 2.The weighted interpolation theorem of operators onhomogeneous type spaces is proved and is used to show the weighted boundedness of L ̄p(p>1)and weak L ̄1 for Calderon-Zygmund operator onhomogeneous type spaces.本文在齐型空间上建立了算子的加权情形下的实内插定理,运用该结果,立即可推导出齐型空间上Calderon-Zygmund算子的加权L ̄p有界性(p>1)和弱L ̄1有界性。 5)Non-homogeneous space非齐型空间 1.Boundedness of the high order commutators with Besov functions on the non-homogeneous spaces;非齐型空间上伴随Besov函数的高阶交换子的有界性 2.Sawano and the duality theory,the authors give the Fefferman-Stein weighted valuable maximal inequalities on non-homogeneous space that generalize the results of K.John的Fefferman-Stein加权向量值极大不等式从欧氏空间Rn推广到非齐型空间上。 6)nonhomogeneous spaces非齐型空间 1.In this paper, the authors prove Tl theorem onnonhomogeneous spaces with Dini kernel conditions, obtain weighted version of Fefferman-Stein vector valued maximal inequality and establish Tl theorem for weighted Triebel-Lizorkin spaces onnonhomogeneous spaces.本文在非齐型空间上证明具有Dini核条件的T1定理,获得了加权Fefferman- Stein向量值极大不等式。 2.The boundedness is established of the commutators generated by Calderón-Zygmund operators or fractional integrals with RBMO(μ) functions or Lipschitz functions in Morrey spaces onnonhomogeneous spaces.证明了由Calderón-Zygmund算子或分数次积分算子与RBMO(μ)函数以及Lipschitz函数生成的交换子在非齐型空间上的Morrey空间中的有界性。 延伸阅读 代数群的齐性空间代数群的齐性空间omogeneous space of an algebrak group代数群的齐性空间【俪1瑰~.粤.沈ofan城罗加止gn卜即妇乳,.叩叭.此。POeTPa.eT即a月代6Pa.,伙K浦rpynuH」一个代数簇(a】罗b口元论优妙)M连同一个代数群(a」罗b份icgro叩)G在其上正则传递的作用.如果x‘M,则迷向群(切tropy脚叩)Gx在G中是闭的.反之,如果H是代数群G的一个闭子群,那么左陪集的集合G/H具有一个代数簇结构,使其成为代数群G的一个齐性空间,此处自然映射形G~G/H是正则的,可分的并且具有以下的泛性质:对于任意在陪集上取常值的态射价:G一x来说,存在一个态射沙:GZH~X使得沙二=伞.如果M是代数群G的任意一个齐性空间而H二认,对某个x〔M,则自然一一映射功:G/H~M是正则的,并且当基域K的特征为零时,价是双正则的(见【11,【31).假设在某个子域kCK上,连通群G,齐性空间M以及G在M上的作用均已被定义,那么k有理点的群G(k)将M(k)变到自身内且对于任意x任M(k)来说,G(k天=认(k).如果k是有限域,则M(k)尹必,再者,如果迷向群认是连通的,则G(k)在M(k)上传递地作用.在一般情形,对M中k有理点的研究归结到G公免上同调(G司幻她coho伽】ogy)理论中的问题(见【2]).一个代数群G的齐性空间总是一个光滑的拟射影簇(见[51).如果G是一个仿射代数群,则簇G/H是射影簇,当且仅当H是G中一个抛物子群(paJ甩bolicsubgro叩)(见【3]).如果G是可约化的,则G/H是仿射簇,当且仅当子群H是可约化的(参见松岛判别法(Matsushilna criterion)).关于特征为O的代数闭域上一个线性代数群G的闭子群H使得G/H是拟仿射的描述是已知的(见【4],[6]).
