一类广义的Marcinkiewicz积分算子的有界性

研究了下述广义Marcinkiewicz积分算子μΩ,αf(x)=∫∞0|∫|x-y|≤tΩ(x-y)|x-y|n-1f(y)dy|2dtt3+2α12当零次齐次函数Ω∈Hq(Sn-1),q=n-1n-1+α,α≥0,且满足一定的消失性,则对于任意的1相似文献   

Boundedness of generalized higher commutators of Marcinkiewicz integrals

Let (b) ＝ (b1,…,bm) be a finite family of locally integrable functions. Then,we introduce generalized higher commutator of Marcinkiwicz integral as follows:μ(b)Ω=(∫∞o|F(b)Ω,t(f)(x)|2et/t)1/2,whereF(b)Ω(f)(x)＝1/t∫|x-y|≤tΩ(x-y)/|x-y|n-1m∏j=1(bj(x)-bj(y))f(y)dy.When bj ∈(A)βj, 1≤j≤m, 0＜βj＜1,m∑j=1βj =β＜n, and Ω is homogeneous of degree zero and satisfies the cancelation condition, we prove that μ(b)Ω is bounded from Lp(Rn)to Ls(Rn), where 1 ＜ p ＜ n/β and 1/s = 1/p -β/n. Moreover, if Ω also satisfies some Lq-Dini condition, then μ(b)Ω is bounded from Lp(Rn) to (F)β,∞p(Rn) and on certain Hardy spaces. The article extends some known results.     

WEIGHTED Lp BOUNDEDNESS FOR MULTILINEAR FRACTIONAL INTEGRAL ON PRODUCT SPACES

For 0 < α < mn and nonnegativeintegers n ≥ 2,m ≥ 1, the multilinear fractional integral is defined by Iα(m )(→f )(x) = ∫(Rn)m 1/ ︱→y |mn-α m ∏ i=1 fi(x-yi)d→y , where →y = (y1,y2,··· ,ym) and →f denotes the m-tuple (f1, f2,··· , fm). In this note, the one-weighted and two-weighted boundednesson Lp(Rn) space for multilinear fractional integral operator Iα(m )and the fractional multi-sublinear maximal operator Mα(m )are established re-spectively. The authors also obtain two-weighted weak type estimate for the...     

BOUNDEDNESS OF GENERALIZED MARCINKIEWICZ INTEGRAL ON THE H~p-SOBOLEV SPACES

§ 1　IntroductionIn this paper,we consider the following general Marcinkiewicz integral:μΩ,αf (x) =∫∞0 ∫|x- y|≤ tΩ (x -y)| x -y| n- 1 f(y) dy2 dtt3+2α1 2 (1 .1 )for all f∈ S(Rn) ,α≥ 0 ,andΩ is a distribution kernel.Whenα=0 ,it is the classicalMacinkiewicz integral operator many mathematicians have studied.There are a lot ofreferences about the topic that you can find.Here we take a simple list of some results ofthis topic.In 1 958,Stein[8] firstproved that ifΩ∈ Lipα(Sn- 1…     

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.     

多线性分数次积分算子一般框架下的交换子的有界性——献给陆善镇教授75华诞

对任意给定的正整数m,Z^＋×{1,...,m}的任意一个有限子集S,定义一般化的多线性分数次积分算子的交换子Iα,→b,S（f）（x）=∫（Rn）^m ∏（i,j）∈S（bi（x）-bi（yj））/（｜x-y1｜＋…＋｜x-ym｜）^mn-α∏（j=1→m）fj（yj）d→y,其中d→y=dy1…dym.此框架下的交换子包含了以往研究的各类分数次积分算子的交换子,并蕴含了多线性背景下新的交换子形式.在上述非常一般框架下,本文给出带多重A→p,q权的多线性分数次积分算子的交换子Iα,→b,S（→f）的加权强型（L^p1（ω1）×···×L^pm（ωm）,L^q（ν→ωq））估计和加权弱型端点估计.本文还得到更一般核条件下的上述结果.     

ROPER-SUFFRIDGE EXTENSION OPERATOR ON A REINHARDT DOMAIN

Let pj ∈ N and pj≥ 1, j = 2, ···, k, k ≥ 2 be a fixed positive integer. We introduce a Roper-Suffridge extension operator on the following Reinhardt domain ΩN ={z =(z1, z′2, ···, z′k)′∈ C × Cn2×···× Cnk: |z1|2+ ||z2||p22+ ··· + ||zk ||pk k 1} given11 by F P′j(zj),(f(z1))p2 z′2, ···,(f′(z1))pk z′k)′, where f is a normaljized biholomorphic function k(z) =(f(z1) + f′(z1)=2 on the unit disc D, and for 2 ≤ j ≤ k, Pj : Cnj-→ C is a homogeneous polynomial of degree pj and zj =(zj1, ···, zjnj)′∈ Cnj, nj ≥ 1, pj ≥ 1,nj1||zj ||j =()pj. In this paper, some conditions for Pjare found under which the loperator p |zjl|pj=1reserves the properties of almost starlikeness of order α, starlikeness of order αand strongly starlikeness of order α on ΩN, respectively.     

赫尔德不等式的推论变形与运用

一、引式:赫尔德不等式 设aij＞0(1≤i≤j≤n,1≤j≤m),若aj(1≤j≤m),且α1+α2+…+αm=1,则mП(n∑aij)aj≥n∑aijaj. 显然,当这个不等式只有两项,即当1/p+1/q=1时,(xp0+xp1+…+xpn)1/p(yq0+yq1+…+yqn)1/a≥x0y0+x1y1+…+xnyn,当α1=α2时即为(Cauchy)不等式,从中可以看到Cauchy不等式是Holder不等式的特殊情况.     

多线性分数次积分算子一般框架下的交换子的有界性

对任意给定的正整数m,Z+×{1,...,m}的任意一个有限子集S,定义一般化的多线性分数次积分算子的交换子Iα,→b,S(f)(x)=integral from n=(Rn)m to ∞[∏(i,j)∈S(bi(x)-bi(yj)(|x-y1|+···+|x-ym|)mn-α]multiply from j=1 to m[fj(yj)d→y ],其中d→y=dy1···dym.此框架下的交换子包含了以往研究的各类分数次积分算子的交换子,并蕴含了多线性背景下新的交换子形式.在上述非常一般框架下,本文给出带多重A→p,q权的多线性分数次积分算子的交换子Iα,→b,S(→f)的加权强型(Lp1(ω1)×···×Lpm(ωm),Lq(ν→ωq))估计和加权弱型端点估计.本文还得到更一般核条件下的上述结果.     

抛物型积分算子的弱型极限行为

设0≤βα, q=α/(α-β), f≥0.本文研究带齐次核?的抛物型奇异积分和分数次积分算子的弱型极限行为,建立了如下结果:limλ→0+λqm({x∈Rn:Tα?,βf(x)λ})=1α||?||q q||f||q L1(Rn),以及limλ→0+λqm({x∈Rn:Tα?,βf(x)-?(x)ρ(x)α-β||f||L1(Rn)λ})=0,其中?满足Lqβ-Dini条件,当β=0时,还需满足∫Sn-1?(x′)J(x′)dσ(x′)=0.同时,给出了相应的抛物型极大奇异积分和Marcinkiewicz积分的弱型极限行为.此外,建立了关于Heisenberg群Hn上Hardy-Littlewood极大函数的相应结果.     

ON MULTILINEAR FRACTIONAL INTEGRALS

§1 Introduction In this paper we consider the boundedness of the followingoperators T_α(A_1, …, A_m, f) (x)=∫_(IR~n) multiply from j=1 to m((R_(K_j+1)(A_j, x, y))/(|x-y|~K_j))f(y)/(|x-y|~(n-α))dy (1)     

BMO ESTIMATES FOR MULTILINEAR FRACTIONAL INTEGRALS

In this paper,the authors prove that the multilinear fractional integral operator T A 1,A 2 ,α and the relevant maximal operator M A 1,A 2 ,α with rough kernel are both bounded from L p (1 p ∞) to L q and from L p to L n/(n α),∞ with power weight,respectively,where T A 1,A 2 ,α (f)(x)=R n R m 1 (A 1 ;x,y)R m 2 (A 2 ;x,y) | x y | n α +m 1 +m 2 2 (x y) f (y)dy and M A 1,A 2 ,α (f)(x)=sup r0 1 r n α +m 1 +m 2 2 | x y | r 2 ∏ i=1 R m i (A i ;x,y)(x y) f (y) | dy,and 0 α n, ∈ L s (S n 1) (s ≥ 1) is a homogeneous function of degree zero in R n,A i is a function defined on R n and R m i (A i ;x,y) denotes the m i t h remainder of Taylor series of A i at x about y.More precisely,R m i (A i ;x,y)=A i (x) ∑ | γ | m i 1 γ ! D γ A i (y)(x y) r,where D γ (A i) ∈ BMO(R n) for | γ |=m i 1(m i 1),i=1,2.     

广义Bernoulli方程及其解法

本文将一阶微分方程中的Bernoulli方程dy/dx=P(x)y+Q(x)yn推广到一类一阶非线性方程dy/dx=Q(x)f(y)+P(x)f(y)·∫1/f(y)dy(其中1/f(y)可积)并得到其初等解法.     

Weighted inequalities for fractional type operators with some homogeneous kernels

In this paper, we study integral operators of the form Tαf(x)=∫Rn|x-A1y|-α1 ··· |x-Amy|-αmf(y)dy,where Ai are certain invertible matrices, αi 0, 1 ≤ i ≤ m, α1 + ··· + αm = n-α, 0 ≤α n. For 1/q = 1/p-α/n , we obtain the Lp (Rn, wp)-Lq(Rn, wq) boundedness for weights w in A(p, q) satisfying that there exists c 0 such that w(Aix) ≤ cw(x), a.e. x ∈ Rn , 1 ≤ i ≤ m.Moreover, we obtain theappropriate weighted BMO and weak type estimates for certain weights satisfying the above inequality. We also give a Coifman type estimate for these operators.     

在Banach空间中推广的Roper-Suffridge算子(Ⅲ)

假定X是具有范数‖·‖的复Banach空间,n是一个满足dim X≥n≥2的正整数.本文考虑由下式定义的推广的Roper-Suffridge算子Φ_(n,β_22γ_2,…,β_(n+1),γ_(n+1))(f):(?)其中x∈Ω_(p1,p2,…,pn+1),β_1=1,γ_1=0和(?)这里p_j1(j=1,2,…,n+1),线性无关族{x_1,x_2,…,x_n}(?)X与{x_1~*,x_2~*,…,x_n~*}(?) X~*满足x_j~*(x_j)=‖x_j‖=1(j=1,2,…,n)和x_j~*(x_k)=0(j≠k),我们选取幂函数的单值分支满足(f(ξ)/ξ)~(β_j)|ξ=0=1和(f′(ξ))~(γ_j)|ξ=0=1,j=2,…,n+1.本文将证明:对某些合适的常数β_j,γ_j,算子Φ_(n,β_2,γ_2,…,β_(n+1),γ_(n+1))(f)在Ω_(p_1,p_2,…,p_(n+1))上保持α阶的殆β型螺形映照和α阶的β型螺形映照.     

Sharp constants in the doubly weighted Hardy-Littlewood-Sobolev inequality

It is well known that the doubly weighted Hardy-Littlewood-Sobolev inequality is as follows,Z Rn Z Rn f(x)g(y)|x||x.y||y|dxdy6 B(p,q,,,,n)kfkLp(Rn)kgkLq(Rn).The main purpose of this paper is to give the sharp constants B(p,q,,,,n)for the above inequality for three cases:(i)p=1 and q=1;(ii)p=1 and 1q 6∞,or 1p 6∞and q=1;(iii)1p,q∞and 1p+1q=1.In addition,the explicit bounds can be obtained for the case 1p,q∞and 1p+1q1.     

具有幂零奇点的七次Hamilton系统Abel积分的零点个数估计

本文研究了具有幂零奇点的七次Hamilton系统的Abel积分的零点个数问题.利用Picard-Fuchs方程法,得到了Abel积分I(h)=∮_(Γh)g(x,y)dx-f(x,y)dy在(0,1/4)上零点个数B(n≤3[(n-1)/4]),其中Γ_h是H(x,y)=x~4+y~4-x~8=h,h∈(0,1/4),所定义的卵形线f(x,y)=∑(1≤4i+4j+1≤n)aijx~(4i+1)y~4j)和g(x,y)=∑(1≤4i+4j+1≤n)bijx~4iy~(4j+1)是x和y的次数不超过n的多项式.     

一类向量四阶非线性微分方程边值问题的奇摄动

我们研究伴有边界摄动的向量边值问题:
ε2y(4)=f(x,y,y″,ε,μ)(μy(x,ε,μ)|_x=μ=A₁(ε,μ),y(x,ε,μ)|_x=1-μ=B₁(ε,μ)
y″(x,ε,μ)|_x=μ=A₂(ε,μ),y″(x,ε,μ)|_x=1-μ=B₂(ε,μ)
其中y,f,A_j和B_j(j=1,2)是n维向量函数和ε,μ是两个正的小参数.虽然纯量边值问题曾有人研究过,但这样的向量边值问题尚未被研究.在适当的假设下,利用微分不等式方法,我们找到向量边值问题的一个解和获得一致有效的渐近展开式.     

变量分离型积分因子存在定理及应用

给出了变量分离型积分因子μ(x,y)=p(x)q(y)的定义,得到了微分方程M(x,y)dx+N(x,y)dy=0存在变量分离型积分因子μ(x,y)=p(x)q(y)的充要条件和计算积分因子的公式.     

寻找积分因子的几种方法

寻找方程:p(x、y)dx Q(x、y)dy=0(1)的积分因子没有简单的一般规律可循.本文给出某些特殊情况下寻求积分因子的几种方法.方法Ⅰ顺藤摸瓜法.如果Pdx Qdy中有一部分P_1dx Q_1dy=du,且(p-p_2)dx (Q-Q_1)dy=0有积分因子f(u),则显然f(u)也是pdx Qdy=0的积分因子,请看下例: