调和Dirichlet空间上Toeplitz算子与小Hankel算子的交换性

本文研究了调和Dirichlet空间上调和符号的Toeplitz算子与小Hankel算子交换性的问题.利用算子矩阵表示的方法,获得了调和Dirichlet空间上调和符号的Toeplitz算子与小Hankel算子交换的充要条件,将Dirichlet空间上的相应结果推广到了调和Dirichlet空间上.     

一类向量值积分方程的优化问题

提出了一类带有参数的向量值积分的优化问题,将H ardy空间中的一些概念推广到了局部凸空部间,尤其是将H ankel算子、最小模型匹配误差、最优解等概念推广到了局部凸空间.     

多重调和Bergman空间上的Toeplitz算子和Hankel算子

完全刻画多重调和Bergman空间上Toeplitz算子和Hankel算子的紧性.运用紧Toeplitz算子这个结果,建立了Toeplitz代数和小Hankel代数的短正合列,推广了单位圆盘上相应的结果.     

Hankel算子乘积的两个问题

设f、u和g是单位圆周Hardy空间H~2中的函数,h是单位圆周上平方可积的函数,■和H_h都是从单位圆周Hardy空间H~2到其正交补空间(H~2)~⊥上有界的Hankel算子.本文得到了 3个Hankel算子的乘积等于一个Hankel算子(即■)成立的充分必要条件,以及■成立的充分必要条件.     

取值于拓扑向量空间的准齐性算子族的共鸣定理

本文给出了取值于局部有界拓扑向量空间的准齐性算子族的共鸣定理,进而给出了从桶形 空间到一般局部凸空间的准齐性拟凸算子族的共鸣定理.     

Bergman空间上可交换的Hankel算子和Toeplitz算子

证明了Bergman空间上的两个小Hankel算子如果是可交换的且其中一个是拟齐次的小Hankel算子,则另一个也是拟齐次的.还研究了Toeplitz算子和小Hankel算子的交换性.     

Dirichlet型空间上Hankel算子和乘法算子

本文讨论了Dirichlet型空间上的再生核,并对Dirichlet型空间上乘法算子,Hankel算子和小Hankel算子的基本性质进行了研究,同时也给出了这些算子的有界性,紧性和Schatten理想的初步刻画。     

Dirichlet型空间上Hankel算子和乘法算子

本文讨论了Dirichlet型空间上的再生核,并对Dirichlet型空间上乘法算了,Hankel算子和小Hankel算子的基本性质进行了研究,同时也给出了这些算子的有界性,紧性和Schatten理想的初步刻画.     

局部凸空间中的f-宽度

本文将赋范空间中的宽度推广到了局部凸空间,并得到了一些相应的结论.     

Lax定理与连续左逆的存在性

本文在局部凸空间的框架下,研究了一般线性算子（未必连续）存在连续左逆的条件,从而获得了Lax定理的一系列新的推广.     

伪辛空间的生成及其表现形式

通过对辛空间的深入分析和研究,从空间中的度量与向量的迷向性问题入手并展开较为详细的讨论,定义"伪辛"的概念,阐述"辛"概念的演变、扩充与伪辛空间生成的事实,进而揭示伪辛空间的本质属性及其与辛空间的内在联系与区别.论述过程同时给出了伪辛空间关于辛空间的内蕴和外延表示式.     

The Construction of I-Bornological Vector Spaces

In this paper, the concept of I-bornological vector spaces and two examples of the spaces are given. Two methods on constructing new I-bornological vector spaces are discussed,one is using a(crisp) bornological vector space to induce an I-bornological vector space, the other is utilizing I-bornological linear maps to generate an I-bornological vector space.     

The Embedding Theory of Native Spaces

In the theory of radial basis functions, mathematicians use linear combinations of the translates of the radial basis functions as interpolants. The set of these linear combinations is a normed vector space. This space can be completed and become a Hilbert space, called native space, which is of great importance in the last decade. The native space then contains some abstract elements which are not linear combinations of radial basis functions. The meaning of these abstract elements is not fully known. This paper presents some interpretations for the these elements. The native spaces are embedded into some well-known spaces. For example, the Sobolev-space is shown to be a native space. Since many differential equations have solutions in the Sobolev-space, we can therefore approximate the solutions by linear combinations of radial basis functions. Moreover, the famous question of the embedding of the native space into L²(Ω) is also solved by the author.     

THE WIDTH IN LOCALLY CONVEX SPACE

In this paper we extend the problems of width in normed space to that in locally convex space and someresults are given.     

The finite element method for parabolic equations

Summary In this first of two papers, computable a posteriori estimates of the space discretization error in the finite element method of lines solution of parabolic equations are analyzed for time-independent space meshes. The effectiveness of the error estimator is related to conditions on the solution regularity, mesh family type, and asymptotic range for the mesh size. For clarity the results are limited to a model problem in which piecewise linear elements in one space dimension are used. The results extend straight-forwardly to systems of equations and higher order elements in one space dimension, while the higher dimensional case requires additional considerations. The theory presented here provides the basis for the analysis and adaptive construction of time-dependent space meshes, which is the subject of the second paper. Computational results show that the approach is practically very effective and suggest that it can be used for solving more general problems.The work was partially supported by ONR Contract N00014-77-C-0623     

$I$-有界型线性空间的构造

本文引进了$I$-有界型线性空间的概念, 并给出两个具体的$I$-有界型线性空间. 进而, 研究了两种构造$I$-有界型线性空间方法:一种是利用普通的有界型线性空间诱导出一个新的$I$-有界型线性空间; 另一种是借助$I$-有界型线性映射生成一个新的$I$-有界型线性空间.     

无套利预算对应的连续性

当消费者的偏好是凸的 (不一定严格凸 )时 ,不完全市场的预算约束是价格单纯形与Grassman流形的乘积空间到商品空间的非线性集合值映射 ,简称为预算对应 .为了研究该模型的一般经济均衡的存在性 ,作者研究了无套利预算对应的性质 ,得到如下主要结果 :无套利预算对应是连续的 .     

非欧空间中双基本图形的度量方程及其应用

本文提出了n维球面型空间和双曲空间中双基本图形的概念,建立了球面型空间与双曲空间中双基图形的度量方程,并给出度量方程的一些应用.     

The Embedding Theory of Native Spaces

In the theory of radial basis functions, mathematicians use linear combinations of the translates of the radial basis functions as interpolants. The set of these linear combinations is a normed vector space. This space can be completed and become a Hilbert space, called native space, which is of great importance in the last decade. The native space then contains some abstract elements which are not linear combinations of radial basis functions. The meaning of these abstract elements is not fully known. This paper presents some interpretations for the these elements. The native spaces are embedded into some well-known spaces. For example, the Sobolev-space is shown to be a native space. Since many differential equations have solutions in the Sobolev-space, we can therefore approximate the solutions by linear combinations of radial basis functions. Moreover, the famous question of the embedding of the native space into L²() is also solved by the author.