齐型空间上的Toeplitz型算子

设X是齐型空间.设Tj,1和Tj,2是具有非光滑核的奇异积分箅子,或者是±I(I是恒等算子).令Toeplitz型算子Tb=N∑j=1Tj,1MbTj,2,其中Mbf(x)=6(x)f(x).研究了当b∈BMO(X)时,Tb(f)在加权情况下的有界性,以及当b∈BMO(X)时,与经典Carderón-Zygmund算子相联的Tb(f)在Morrey空间上的有界性.     

与强奇异Calderón-Zygmund算子相关的Toeplitz型算子

研究与强奇异Calderón-Zygmund算子和Lipschitz函数6∈ΛA_(βO)(R~n)相关的Toeplitz型算子T_b(f)从L~p(R~n)到L~q(R~n)的有界性和L~p(R~n)到Triebel- Lizorkin空间F(_p~(βO,∞))的有界性,1／q=1／p-βO／n．得到广义Toeplitz型算子Θ(_(αO)~b)是L~p(R~n)到L~q(R~n)有界的,1／q=1／p-(αO βO)／n．上述结果包含相应交换子的有界性．同时还得到与强奇异Calderón-Zygmund算子和BMO函数b相关的Toeplitz型算子T_b(f)的L~p(R~n)有界性,1＜p＜∞.     

与非光滑核的奇异积分算子的Toeplitz算子的λ-中心BMO估计

设L是L~2(R~n)上的一个解析半群的无穷小生成元,核函数满足高斯上界.L~(-α/2)(0αn)是由L生成的广义分数次积分算子,若T_(j,1)是与L有关的带有非光滑核的奇异积分算子,或T_(j,1)=I,T_(j,2),T_(j,4)是线性算子且具有(B~(p,λ),B~(p,λ))有界性(1p∞,λ∈R),T_(j,3)=±I(j=1,2,…,m),其中I为恒等算子,M_b是乘法算子.当b∈CBMO~(p_2,λ_2)函数时,证明Toeplitz型算子θ_a~b是B~(p_1,λ_1)到B~(q,λ)上的有界算子,并由此得广义分数次积分交换子[b,L~(-a/2)]和非光滑核的奇异积分交换子[b,T]在中心Morrey型空间上的有界性.     

各向异性函数空间上的多线性算子的估计及其应用

设A是Rn上的各向异性伸缩, L是由各向异性Calderón-Zygmund算子生成的一般的多线性算子.本文得到L从加权Lebesgue空间Lwp(Rn)到无权的各向异性Hardy空间HAp (Rn)的有界性.另外,对各向异性Hardy空间H1(Rn)和加权各向异性BMO空间BMOAw(Rn)得到包含关系:BMOAw(Rn)■(H1A(Rn))*.作为应用,对加权各向异性BMO函数b和各向异性Calderón-Zygmund算子T生成的交换子[T, b],得到‖[T, b](f)‖Lwp(Rn)C‖b‖BMOwA(Rn)‖f‖Lpw(Rn).以上所有结果在经典的各向齐性情形下也是新的.     

粗糙核多线性分数次积分算子在加权Herz空间的有界性

研究两类带粗糙核的多线性分数次积分算子T_(Ω,α)~A, T_(Ω,α)~Af(x)=∫R_m(A;x,y)/R~n|x- y|~(n+m-α-1)Ω(x-y)f(y)dy及其相关的极大算子M_(Ω,α)~A在加权Herz空间的有界性,其中Ω∈L~s(S~(n-1))(s>1)是R~n中的零次齐次函数,m∈N,A有m=1阶导数且D~γA∈BMO(R~n)或D~γA∈L~r(R~n)(|γ|=m -1,1相似文献   

一类振荡积分算子在Wiener 共合空间上的有界性

假设a,b0并且K_(a,b)(x)=(e~(i|x|~(-b)))/(|x|~(n+a))定义强奇异卷积算子T如下:Tf(x)=(K_(a,b)*f)(x),本文主要考虑了如上定义的算子T在Wiener共合空间W(FL~p,L~q)(R~n)上的有界性.另一方面,设α,β0并且γ(t)=|t|~k或γ(t)=sgn(t)|t|~k.利用振荡积分估计,本文还研究了算子T_(α,β)f(x,y)=p.v∫_(-1)~1f(x-t,y-γ(t))(e~(2πi|t|~(-β)))/(t|t|~α)dt及其推广形式∧_(α,β)f(x,y,z)=∫_(Q~2)f(x-t,y-s,z-t~ks~j)e~(-2πit)~(-β_1_s-β_2)t~(-α_1-1)s~(-α_2-1)dtds在Wiener共合空间W(FL~p,L~q)上的映射性质.本文的结论足以表明,Wiener共合空间是Lebesgue空间的一个很好的替代.     

双线性Fourier乘子交换子的有界性与紧性

假定T_σ是关于乘子σ的双线性Fourier乘子算子,其中σ满足如下Sobolev正则条件:对某个s∈(n,2n],有sup_(κ∈Z)‖σ_k‖W~s(R~(2m))∞.对于p_1,p_2,p∈(1,∞)且满足1/p=1/p_1+1/p_2和ω=(ω_1,ω_2)∈A_(p/t)(R~(2n)),建立了T_σ及其与函数b=(b_1,b_2)∈(BMO(R~n))~2生成的交换子T_(σ,b)由L~(p_1,λ)(ω_1)×L~(p_2,λ)(ω_2)到L~(p,λ)(v_w)的有界性;同时,在b_1,b_2∈CMO(R~n)(C_c~∞(R~n)在BMO拓扑下的闭包)的条件下,证明交换子T_(σ,b)是L~(p_1,λ)(ω_1)×L~(p_2,λ)(ω_2)到L~(p,λ)(v_w)的紧算子.为了得到主要结果,我们先后建立了几个双(次)线性极大函数在加多权Morrey空间上的有界性以及该空间中准紧集的判定.     

带粗糙核的Carleson测度

证明了如果b∈BMO(Rn),对于Fefferman C.的一个经典结果(ψ∈S(Rn)∫ψ(x)dx=0,那么│ψt*6(x)│2dxdt/t为R+n+1上的Carleson测度当且仅当b∈BMO(Rn)).确定的Carleson 测度,ψ的光滑性条件是不必要的.作为此结果的应用,还给出了带粗糙核的仿积的L2有界性以及带粗糙核的Littlewood-Paley算子在BLO(Rn)上的有界性,它们分别改进了某些已知结果.     

关于压缩映射的一点注记

B.Ray 1974年在[1]中证明了下列定理: 定理 设X是完备的距离空间,T_1:X→X,T_2:X→X是两个映射.若存在h∈(0,1),使 d(T_1x,T_2y)≤hd(x,y),x,y∈X,(1)则T_1和T_2必有公共不动点。     

Banach空间中一类广义Lipschitz非线性算子迭代序列的收敛定理

1　引言与预备知识设 X为一实 Banach空间 ,X*是 X的对偶空间 ,正规对偶映射 J:X→ 2 X*定义为 :J( x) ={ f∈ X*;〈x,f〉 =‖ f‖ .‖ x‖ ,‖ f‖ =‖ x‖ }其中〈· ,·〉表示 X和 X*的广义对偶组 .用 j(· )表示单值的正规对偶映射 .设 K是 X的一非空子集 ,算子 T:K→ X称为φ-强增生的[1 ,2 ] ,如果存在一个严格增加函数φ:[0 ,+∞ )→ [0 ,+∞ ) ,φ( 0 ) =0满足 x,y∈ K, j( x-y)∈ J( x-y)使得〈Tx -Ty,j( x -y)〉≥φ(‖ x -y‖ ) .‖ x -y‖ ( 1 )( 1 )中若 φ( t) =kt(其中 k>0 ) ,相应地称 T为强增生算子 ,k称为 T的…     

Boundedness of Singular Integral Operators on Herz-Morrey Spaces with Variable Exponent

Let ? ∈ L~s(S~(n-1))(s1) be a homogeneous function of degree zero and b be a BMO function or Lipschitz function. In this paper, the authors obtain some boundedness of the Calderón-Zygmund singular integral operator T_? and its commutator [b, T_?] on Herz-Morrey spaces with variable exponent.     

与强奇异 Calder\''{o}n-Zygmund算子相关的Toeplitz算子的双权估计

研究了与强奇异Calder\'{o}n-Zygmund算子和加权 Lipschitz函数${\rm Lip}_{\beta_0,\omega}$相关的Toeplitz算子$T_b$的sharp极大函数的点态估计,并证明了Toeplitz算子是从 $L^p(\omega)$到$L^q(\omega^{1-q})$上的有界算子.此外, 建立了与强奇异Calder\'{o}n-Zygmund算子和加权 BMO函数${\rm BMO}_{\omega}$相关的Toeplitz算子$T_b$的sharp极大函数的点态估计,并证明了Toeplitz算子是从 $L^p(\mu)$到$L^q(\nu)$上的有界算子.上述结果包含了相应交换子的有界性.     

Boundedness Characterization of Maximal Commutators on Orlicz Spaces in the Dunkl Setting

On the real line, the Dunkl operators$$D_{\nu}(f)(x):=\frac{d f(x)}{dx} + (2\nu+1) \frac{f(x) - f(-x)}{2x}, ~~ \quad\forall \, x \in \mathbb{R}, ~ \forall \, \nu \ge -\tfrac{1}{2}$$are differential-difference operators associated with the reflection group $\mathbb{Z}_2$ on $\mathbb{R}$, and on the $\mathbb{R}^d$ the Dunkl operators $\big\{D_{k,j}\big\}_{j=1}^{d}$ are the differential-difference operators associated with the reflection group $\mathbb{Z}_2^d$ on $\mathbb{R}^{d}$.In this paper, in the setting $\mathbb{R}$ we show that $b \in BMO(\mathbb{R},dm_{\nu})$ if and only if the maximal commutator $M_{b,\nu}$ is bounded on Orlicz spaces $L_{\Phi}(\mathbb{R},dm_{\nu})$. Also in the setting $\mathbb{R}^{d}$ we show that $b \in BMO(\mathbb{R}^{d},h_{k}^{2}(x) dx)$ if and only if the maximal commutator $M_{b,k}$ is bounded on Orlicz spaces $L_{\Phi}(\mathbb{R}^{d},h_{k}^{2}(x) dx)$.     

Toeplitz Operator Related to Singular Integral with Non-Smooth Kernel on Weighted Morrey Space

Let T_1 be a singular integral with non-smooth kernel or ± I, let T_2 and T_4 be the linear operators and let T_3= ±I. Denote the Toeplitz type operator by T~b= T_1M~bI_αT_2+T_3I_αM~bT_4,where M~bf=bf, and I_α is the fractional integral operator. In this paper, we investigate the boundedness of the operator T~b on the weighted Morrey space when b belongs to the weighted BMO space.     

Generalized Weighted Morrey Estimates for Marcinkiewicz Integrals with Rough Kernel Associated with Schrödinger Operator and Their Commutators

Let L =-?+V(x) be a Schr?dinger operator, where ? is the Laplacian on ■~n,while nonnegative potential V(x) belonging to the reverse H?lder class. The aim of this paper is to give generalized weighted Morrey estimates for the boundedness of Marcinkiewicz integrals with rough kernel associated with Schr?dinger operator and their commutators.Moreover, the boundedness of the commutator operators formed by BMO functions and Marcinkiewicz integrals with rough kernel associated with Schr?dinger operators is discussed on the generalized weighted Morrey spaces. As its special cases, the corresponding results of Marcinkiewicz integrals with rough kernel associated with Schr?dinger operator and their commutators have been deduced, respectively. Also, Marcinkiewicz integral operators, rough Hardy-Littlewood(H-L for short) maximal operators, Bochner-Riesz means and parametric Marcinkiewicz integral operators which satisfy the conditions of our main results can be considered as some examples.     

双圆盘加权Dirichlet空间上Toeplitz算子的约化子空间

刻画了双圆盘加权Dirichlet空间D_α(D~2)上Toeplitz算子T_Z_1N(或T_z_2N)和T_z_1N_z_2N的约化子空间.结果表明Toeplitz算子T_z_1N(或T_z_2N)的约化子空间结构与权系数α无关,而Toeplitz算子T_2_1N_z_2N的约化子空间结构与权系数α有关.     

一类多线性奇异积分算子的加权估计

In this paper, weighted estimates with general weights are established for the multilinear singular integral operator defined by TAf(x) = p. v.RnΩ(x- y)|x- y|n+1 A(x)- A(y)- A(y)(x- y) f(y)dy,where Ω is homogeneous of degree zero, has vanishing moment of order one, and belongs to Lipγ(Sn-1) with γ∈(0, 1], A has derivatives of order one in BMO(Rn).     

位势型算子的加权不等式

Let Ф be a non-negative locally integrable function on R^n and satisfy some weak growth conditions, define the potential type operator TФ by TФf（x）=∫R^n Ф（x-y）f（y）dy. The aim of this paper is to give several strong type and weak type weighted norm inequalities for the potential type operator TФ.     

一类Hankel算子与Toeplitz算子的Sp性质

对于L~(α,2)(D))的两类Moebius不变子空间A~(α,2)(D)和A~(β,2)(D),我们定义了它们之间的Toeplitz算子T_f~s与其乘积空间上的Hankel算子H_f~r,并且研究了它们的有界性、紧性及Schatten-von Neumann性质。