关于Triebei空间上的算子值傅里叶乘子

利用Stroemberg-Torchinsky分解,给出了Triebel空间Fp-q（R^n,X）上算子值傅里叶乘子的一个充分条件．在n〈min（p,q）情形下,这里给出的充分条件改进了之前已知的结果．     

数学进展总目录

第1期 综述文章 灵活的应用数学技术.......................................................................……杨德庄(l) 算子值傅里叶乘子与向量值边值问题最大正则性..····......................................……步尚全(17) 研究论文 一类非凸粘性平衡律方程的粘性激波解的存在性与稳定性(英)................................……邢秀侠(4a) 二元混合型索赔分布的复合模型的递推方程(英).....................……周俊，杨静平，程士安，程乾生(54) 二维Finsler空间是共形平坦的若干判定条件...........................…     

Banach空间上有限时滞退化微分方程的适定性

该文在Lebesgue-Bochner空间L~p(T,X)和周期Besov空间B_(p,q)~s(T,X)上研究二阶有限时滞退化微分方程:(Mu′)′(t)=Au(t)+Bu′(t)+Fu_t+f(t)(t∈T:=[0,2π]),u(0)=u(2π),(Mu′)(0)=(Mu′)(2π)的适定性.利用向量值函数空间上的算子值傅里叶乘子定理,文中给出上述方程具有适定性的充要条件.     

关于Triebel空间上的算子值傅里叶乘子

利用Str6mberg-Torchinsky分解,给出了Triebel空间FEp.q(Rn,X)上算子值傅里叶乘子的一个充分条件.在rl相似文献   

Herz型Besov空间的点态乘子及应用

作者研究了Herz型Besov空间的点态乘子 ,并利用此点态乘子证明了一类拟微分算子在Herz型Besov空间上的有界性     

超空间上的选择算子理论与集值随机过程

本文首次引入了超空间(子集空间)上选择算子概念,给出了几类选择算子的存在定理。作为它们的应用,给出了集值随机变量同分布的选择刻画;圆满解决了依分布收敛集值随机变量列的向量值选择问题;研究了集值随机过程的正则选择与Markov选择,给出了集值Markov过程的离散化定理,证明了紧凸集值渐近鞅的向量值渐近鞅选择存在定理。     

向量值广义Segal-Bargmann空间上具有正算子值符号的Hankel算子（英文）

本文主要研究向量值广义Segal-Bargmann空间上具有正算子值符号的Hankel算子的有界性和紧性.这些性质分别是通过研究有界平均振荡算子和消失平均振荡算子的方法来得到的.同时我们利用Berezin变换定义了BMO_φ~2空间和VMO_φ~2空间,并刻画它们的几何性质.     

强算子值鞅型序列

在[1]中,Skorohod在可分的Hilbert空间中定义了强随机线性算子,这种强随机线性算子对研究随机积分有重要应用。[1]中还证明了强随机线性算子值鞅的收敛定理。本文在可分的Banach空间中定义了强随机线性算子和强随机线性算子值鞅型序列。证明了强随机线性算子值鞅型序列成立着和向量值鞅型序列类似的收敛定理,分解定理和选样定理,推广了[1]中的有关结果。同时这些定理也是向量值鞅型序列相应结果([2—5])的推广。     

伴随Herz空间的Hardy空间上的向量值Calderón-Zygmund算子(英文)

本文证明了一类具有向量值核的Calderon－Zygmund算子是Herz型Hard,空间HKp到向量值Herz空间KE,p有界的,应用这一结果,得到了粗糙核Calderon－Zygmund算子,极大型Calderon－Zygmund算子,极大算子等是HKp到Kp有界的．     

向量值分数阶时滞微分方程的适定性 献给余家荣教授100华诞

本文利用向量值H?lder连续函数空间C~α(R; X)上的算子值Fourier乘子定理,给出实轴上向量值分数阶时滞微分方程D~βu(t)=Au(t)+Fu_t+f (t), t∈R具有C~α-适定性的充分条件,其中A为某Banach空间X上的线性闭算子, F为从C([-r, 0]; X)到X的有界线性算子, r 0固定,函数u的t平移u_t定义为u_t(s)=u(t+s)(t∈R, s∈[-r, 0]),β 0固定, D~βu为函数u的β-阶Caputo导数.     

OPERATOR-VALUED FOURIER MULTIPLIER THEOREMS ON TRIEBEL SPACES

1IntroductionIn a series of recent publications operator-valued Fourier multipliers on vector-valued func-tion spaces were studied(see e.g.[1,2,3,5,6,7,14,16]).They are needed to establish existence anduniqueness as well as regularity of di?erential equat…     

On strong solutions of a Robin problem modelling heat conduction in materials with corroded boundary

Motivated by a practical problem on a corrosion process, we shall study a third kind of BVP for a large class of elliptic equations in vector-valued L_p spaces. Particularly we will determine optimal spaces for boundary data and get maximal regularity for inhomogeneous equations. Then based on these results we shall treat some nonlinear problems. Our approach will be based on the semigroup theory, the interpolation theory of Banach spaces, fractional powers of positive operators, operator-valued Fourier multiplier theorems and the Banach fixed point theorem.     

Equivalence of Haar Bases Associated with Different Dyadic Systems

In this note we give sufficient conditions on two dyadic systems on a space of homogeneous type in order to obtain the equivalence of corresponding Haar systems on Lebesgue spaces. The main tool is the vector-valued Fefferman–Stein inequality for the Hardy–Littlewood maximal operator.     

Anisotropic elliptic equations with VMO coefficients

This paper presents the study of maximal regularity properties for anisotropic differential-operator equations with VMO (vanishing mean oscillation) coefficients. We prove that the corresponding differential operator is separable and is a generator of analytic semigroup in vector-valued L^p spaces. Moreover, discreetness of spectrum and completeness of root elements of this operator is obtained.     

Maximal regularity in continuous interpolation spaces and quasilinear parabolic equations

In this paper we establish a geometric theory for abstract quasilinear parabolic equations. In particular, we study existence, uniqueness, and continuous dependence of solutions. Moreover, we give conditions for global existence and establish smoothness properties of solutions. The results are based on maximal regularity estimates in continuous interpolation spaces. An important new ingredient is that we are able to show that quasilinear parabolic evolution equations generate a smooth semiflow on the trace spaces associated with maximal regularity, which are the natural phase spaces in this framework. Received August 10, 2000; accepted September 20, 2000.     

Maximal regularity of evolution equations on discrete time scales

We consider the question of Lp-maximal regularity for inhomogeneous Cauchy problems in Banach spaces using operator-valued Fourier multipliers. This follows results by L. Weis in the continuous time setting and by S. Blunck for discrete time evolution equations. We generalize the later result to the case of some discrete time scales (discrete problems with nonconstant step size). First we introduce an adequate evolution family of operators to consider the general problem. Then we consider the case where the step size is a periodic sequence by rewriting the problem on a product space and using operator matrix valued Fourier multipliers. Finally we give a perturbation result allowing to consider a wider class of step sizes.     

Operator-valued martingale transforms in rearrangement invariant spaces and applications

In this paper the operator-valued martingale transform inequalities in rearrangement invariant function spaces are proved. Some well-known results are generalized and unified. Applications are given to classical operators such as the maximal operator and the p-variation operator of vector-valued martingales, then we can very easily obtain some new vector-valued martingale inequalities in rearrangement invariant function spaces. These inequalities are closely related to both the geometrical properties of the underlying Banach spaces and the Boyd indices of the rearrangement invariant function spaces. Finally we give an equivalent characterization of UMD Banach lattices, and also prove the Fefferman-Stein theorem in the rearrangement invariant function spaces setting.     

Maximal regularity for perturbed integral equations on periodic Lebesgue spaces

We characterize the maximal regularity of periodic solutions for an additive perturbed integral equation with infinite delay in the vector-valued Lebesgue spaces. Our method is based on operator-valued Fourier multipliers. We also study resonances, characterizing the existence of solutions in terms of a compatibility condition on the forcing term.     

Elliptic operators and maximal regularity on periodic little-H?lder spaces

We consider one-dimensional inhomogeneous parabolic equations with higher-order elliptic differential operators subject to periodic boundary conditions. In our main result we show that the property of continuous maximal regularity is satisfied in the setting of periodic little-H?lder spaces, provided the coefficients of the differential operator satisfy minimal regularity assumptions. We address parameter-dependent elliptic equations, deriving invertibility and resolvent bounds which lead to results on generation of analytic semigroups. We also demonstrate that the techniques and results of the paper hold for elliptic differential operators with operator-valued coefficients, in the setting of vector-valued functions.     

Solution of the Dirichlet and Neumann problems for a modified Helmholtz equation in Besov spaces on an annulus

Here we study Dirichlet and Neumann problems for a special Helmholtz equation on an annulus. Our main aim is to measure smoothness of solutions for the boundary datum in Besov spaces. We shall use operator theory to solve this problem. The most important advantage of this technique is that it enables to consider equations in vector-valued settings. It is interesting to note that optimal regularity of this problem will be a special case of our main result.