具有齐性核的Marcinkiewicz积分在Herz型Hardy空间的有界性

本文讨论了具有齐性核的Marcinkiewicz积分μΩ在Herz型Hardy空间的有界性,证明了μΩ是从HKqa,p(Rn)到Kqa,p(Rn)有界的.     

Marcinkiewicz积分在Herz型Hardy空间上的性质

给出了Marcinkiewicz积分在Herz型Hardy空间上的有界性证明。即当n(1 - 1q) ≤α 相似文献   

Marcinkiewicz积分交换子在Herz型空间中的弱型估计

用μΩ表示Marcinkiewicz积分,μΩ,b表示μΩ与函数b∈BMO(R~n)生成的交换子．本文证明了交换子μΩ,b是从Herz型Hardy空间H■_q~(n(1-(1/q)),p)(R~n)到弱Herz空间W■_q~(n(1-(1/q)),p)(R~n)有界的,其中0＜p≤1,1＜q＜∞．     

带粗糙核的Marcinkiewicz积分算子在Herz空间的有界性

本文考虑如下的Macinkiewicz积分算子μΩ（f）（x）{∫0^∞｜FΩ ,t（x）｜^2t^-3dt}^1/2,其中FΩ ,t（x）=∫｜x-y｜≤tΩ （x-y）｜x-y｜^-n＋2f（y）dy在一定的条件下证明它是在Herz空间Kq^α,q上有界同时也是从Herz空间K1^α,p到弱Herz空间WK1^α,p上有界。     

Herz空间中的加权Hardy-Littlewood平均算子

本文给出了加权Hardy-Littlewood平均算子Uψ在Herz空间Kqα,p(Rn)中有界的充分必要条件并估计了相应的算子范数．     

具有齐性核Marcinkiewicz积分交换子的Lipschitz估计

本文研究了Marcinkiewicz积分交换子μΩ,b(f)(x)=(integral from n=0 to ∞|Fb,t(f)(x)|2 dt/t3)1/2, 其中Fb,t(f)(x)=integral from n=|x-y|≤t(Ω(x-y_/|x-y|n-1)b(x)-b(y)f(y)dy及b∈Λβ,证明了算子μΩ,b是Lp(Rn) 到Fβ,∞p(Rn)上的有界算子并且也是Lp(Rn)到Lq(Rn)上的有界算子.     

分数次积分在局部Hardy空间上的有界性质

证明了当0<αn/(n-α)时,分数次积分Iα是局部Hardy空间hp(Rn)到空间hp(Rn)+Lq(Rn)的一个线性映射.     

分数次积分交换子的一个端点估计

设0<β<1,α,β0<αnn-α.给出了当p=nn+β时,分数次积分I与L ipsch itz函数b的交换子从局部H ardy空间hp(Rn)到空间hp(Rn)+Lq(Rn)上的有界性估计.     

Elementary characterizations of generalized weighted Morrey-Campanato spaces

Let α∈ (0,∞), p, q ∈ [1,∞), s be a nonnegative integer, and ω∈ A1(Rn) (the class of Muckenhoupt's weights). In this paper, we introduce the generalized weighted Morrey-Campanato space L(α, p, q, s, ω; Rn) and obtain its equivalence on different p ∈ [1,β) and integers s ≥ nα (the integer part of nα), where β = (1q - α)-1 when α 1q or β = ∞ when α≥ 1q. We then introduce the generalized weighted Lipschitz space ∧(α, q, ω; Rn) and prove that L(α, p, q, s, ω; Rn)  ∧(α, q, ω; Rn) when α∈ (0,∞), s ≥ nα , and p ∈ [1,β).     

Marcinkiewicz积分交换子的有界性

本文考虑了Marcinkiewicz积分交换子μΩb在Lp(Rn)和Hardy空间的有界性, 其中Ω∈L1(Sn-1)是Rn中的零次齐次函数且满足一类Lq-Dini条件,因此改进了以往的结果．     

鞅空间理论的新进展

本文是一篇综述性的文字,内容主要是近年来有关鞅空间理论的发展状况,特别是集中于B-值鞅和弱型鞅空间两个部分,可以看做是整个鞅空间理论发展的一个侧面.希望以此引起读者对鞅论的了解和进一步研究的兴趣.具体内容分为以下三节:1.研究鞅空间理论的意义,阐述鞅空间理论与调和分析的关系;2.鞅空间理论的向量值化,阐述B-值鞅不等式与Banach空间几何学的相互依存关系;3.弱型鞅空间与变指数鞅空间的不等式及其应用.     

SOME RESULTS RELATED TO THE SEPARABLE QUOTIENT PROBLEM

ＳＯＭＥＲＥＳＵＬＴＳＲＥＬＡＴＥＤＴＯＴＨＥＳＥＰＡＲＡＢＬＥＱＵＯＴＩＥＮＴＰＲＯＢＬＥＭ￥（钟怀杰）ＺｈｏｎｇＨｕａｉｊｉｅ（Ｄｅｐｔ．ｏｆＭａｔｈ．，ＦｕｊｉａｎＮｏｒｍａｌＵｎｉｖｅｒｓｉｔｙ，Ｆｕｚｈｏｕ３５０００７，Ｃｈｉｎａ．）Ａｂｓ...     

Calderon-Zygmund型算子在加权Herz型Hardy空间上的弱型估计

本文引入了加权弱Herz型Hardy空间，并证明了当a=n(1-1/q) δ时，胡国恩和陆善镇等在文[1]中所考虑的两类Calderon-Zygmund型算子分别连续地映加权Herz型Hardy空间到加权弱Herz空间和加权弱Herz型Hardy空间。     

THE BLOSSOM APPROACH TO THE DIMENSION OF THE BIVARIATE SPLINE SPACE

1. IntroductionLet fi C mZ be a closed simply connected polygonal region, andA:~ {fit}!=,, fi = .6 fitz= 1its regular triangulation, i.e. the trianglesfit, ioj, i / i,can have in common only a vertex or a whole edge. Let V de'note the set of innervenices, E the set of inner edges, and E the set of all edges of a. PutmV:= IVI, mE:~ IEI.The planar graph G:~ (V, E) clearly describes A. However, it's sometimes useful toconsider also the dual planar graph Q:= (V,e), where venices i E V co…     

THE HENSTOCK INTEGRAL FOR FUNCTIONS WITH VALUES IN NUCLEAR SPACES AND THE HENSTOCK LEMMA

This paper shows that Henstock‘s Lemma holds for functions with values in a countably Hilbert space, where the Henstock integral is defined as a natural extension of the resl valued case.     

拟鞅的Fefferman不等式和对偶定理

本文讨论了拟鞅的Fefferman不等式和Hardy空间的对偶空间. 利用鞅的相关结果和Doob分解的方法, 把鞅的Fefferman不等式推广到拟鞅情形, 并描述了拟鞅的Hardy空间Ĥ_p在1 < p < ∞)时的对偶空间.     

双曲空间中Veljan-Korchmaros型不等式及应用

本文研究了双曲空间Hn(K)中n维高维单形的几何不等式问题.利用距离几何的理论与方法,获得了涉及n维双曲单形体积,侧面积与棱长的几个几何不等式,这些几何不等式是双曲单形几何不等式的基础.     

THE FUNCTIONAL DIMENSION OF SOME CLASSES OF SPACES

The functional dimension of countable Hilbert spaces has been discussed by some authors. They showed that every countable Hilbert space with finite functional dimension is nuclear. In this paper the authors do further research on the functional dimension, and obtain the following results: (1) They construct a countable Hilbert space, which is nuclear, but its functional dimension is infinite. (2) The functional dimension of a Banach space is finite if and only if this space is finite dimensional. (3) Let B be a Banach space, B* be its dual, and denote the weak * topology of B* by σ(B*,B). Then the functional dimension of (B*,σ(B*,B)) is 1. By the third result, a class of topological linear spaces with finite functional dimension is presented.     

加权Sobolev空间的完备性

本文研究加权Soblev空间完备性 .我们运用Ap 权的构造性质证明 ,当 1

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ENDPOINT ESTIMATES FOR THE COMMUTATOR OF PSEUDO-DIFFERENTIAL OPERATORS

It is well known that the commutator Tb of the Calder′on-Zygmund singular integral operator is bounded on Lp(Rn) for 1 p +∞if and only if b∈BMO [1]. On the other hand, the commutator Tb is bounded from H1(Rn) into L1(Rn) only if the function b is a constant [2]. In this article, we will discuss the boundedness of commutator of certain pseudo-differential operators on Hardy spaces H1. Let Tσbe the operators that its symbol is S01,δwith 0≤δ 1, if b∈LMO∞, then, the commutator [b, Tσ] is bounded from H1(Rn) into L1(Rn) and from L∞(Rn) into BMO(Rn); If [b, Tσ] is bounded from H1(Rn) into L1(Rn) or L∞(Rn) into BMO(Rn), then, b∈LMO_(loc).