Banach空间中一类度量投影的判据及表达式

X为自反、严格凸Ｂａｎａｃｈ 空间,L为X中闭子空间,P：X→L为单值算子,该文给出P成为L上度量投影P_L的判据及P_L为线性算子的充分必要条件．在自反Ｂａｎａｃｈ空间中,利用对偶映射,给出超平面上（值）度量投影的表达式．对于自反、严格凸、光滑的Ｂａｎａｃｈ 空间中线性流形上的（单值）度量投影,利用广义右逆的表示,求出其表达式．在后继文章中将给出此表达式的应用．     

Banach空间L~P(Ω)中非齐次不适定椭圆边值问题的最小范数极值解

该文对 Ｂａｎａｃｈ空间 ＬＰ（Ω）中二阶椭圆方程非齐次不适定 Ｎｅｕｍａｎｎ 问题,引入伪变分解的概念,应用Ｂａｎａｃｈ空间几何及［３］中关于Ｂａｎａｃｈ空间中线性算子的Ｍｏｏｒｅ－Ｐｅｎｒｏｓｅ广义逆．证明了上述伪变分解为最小范数极值解,从而为适定的．     

Banach空间L_p（Ω）中非齐次不适定椭圆边值问题的最小范数极值解

该文对Ｂａｎａｃｈ空间犔犘（Ω）中二阶椭圆方程非齐次不适定Ｎｅｕｍａｎｎ问题,引入伪变分解的概念,应用Ｂａｎａｃｈ空间几何及［３］中关于Ｂａｎａｃｈ空间中线性算子的Ｍｏｏｒｅ Ｐｅｎｒｏｓｅ广义逆,证明了上述伪变分解为最小范数极值解,从而为适定的．     

Banach空间中广义正交分解定理与广义正交可补子空间

本文首先将 Ｈｉｌｂｅｒｔ空间中的Ｒｉｅｓｚ正交分解定理推广到 Ｂａｎａｃｈ空间,得到 Ｂａｎａｃｈ空间广义正交分解定理．然后,利用此定理讨论由Ｊａｍｅｓ Ｒ．Ｃ．［１］引入的Ｂａｎａｃｈ空间中正交概念及 Ｎａｓｈｅｄ Ｍ．Ｚ．［２］引入的 Ｂａｎａｃｈ空间中（广义）正交可补子空间,得到判别子空间广义正交可补的充分必要条件,并由此给出Ｈｉｌｂｅｒｔ空间的一个新特征．     

Banach空间中Moore-Penrose广义逆与不适定边值问题

设Ｘ，Ｙ为Ｂａｎａｃｈ空间，Ｄ（Ａ）Ｘ，Ａ：Ｄ（Ａ）→Ｙ为具有闭值域的闭稠定线性算子．本文不假设Ａ具有“定义域可分解”条件［１８］，引入Ａ的Ｍｏｏｒｅ－Ｐｅｎｒｏｓｅ广义逆Ａ＋．与Ｍ．Ｚ．Ｎａｓｈｅｄ引入的不同，Ａ＋一般非线性．本文在空间Ｘ，Ｙ的一定几何框架下，证得Ａ＋的存在唯一性、极小性、连续性，并给出了线性的充要条件，便于将Ａ＋应用于方程、优化、控制等问题．作为应用，本文第二部分利用Ｍｏｏｒｅ－Ｐｅｎｒｏｓｅ广义逆讨论空间ＬＰ（Ω）（１＜Ｐ）中一类不适定的边值问题．在另文，给出广义逆在控制论中的应用．     

非线性Lipschitz算子的定量性质(V)──数值值域

本文引入 Ｂａｎａｃｈ空间上非线性 Ｌｉｐｓｃｈｉｔｚ算子 Ｔ的另一个重要定量特性——数值值域Ｗ（Ｔ）．我们证明： Ｗ（Ｔ）与Ｇｅｒｓｃｈｇｏｉｎ域Ｇ（Ｔ）及谱集σ（Ｔ）具有关系σ（Ｔ） ■ ＣｏＷ（Ｔ）＝ Ｇ（Ｔ）．同时,利用此数值域,我们对算子可逆,稳定与压缩的定量性质进行了深入的研究．     

Banach空间中线性算子的集值度量右逆的表示及应用

在自反 Ｂａｎａｃｈ空间中运用对偶映射方法给出闭稠定满射线性算子的集值度量右逆的表示．拓广了已有的相应结果．     

Banach格上正则算子格

本文首先对 Ｂａｎａｃｈ格 Ｅ给出了条件,使得对任意非 Ｄｅｄｅｋｉｎｄ　σ－完备的Ｂａｎａｃｈ格Ｆ,正则算子空间Ｌ~ｒ（Ｅ,Ｆ）均是一Ｒｉｅｓｚ空间．其次对Ｂａｎａｃｈ格Ｆ给出了一些刻划,使之每个由Ｌ_ｐ－空间到Ｆ内的连续线性算子均是正则的．一些相关结果也得以讨论．     

The Continuity of Epimorphisms of Banach Algebras

ＬｅｔｆｂｅａｌｉｎｅａｒｍａｐｐｉｎｇｆｒｏｍａＢａｎａｃｈｓｐａｃｅＸｔｏａＢａｎａｃｈｓｐａｃｅＹ．Ｔｈｅｎｔｈｅｓｅｐａｒａｔｉｎｇｓｐａｃｅｏｆｆｉｓ（ｆ）＝｛ｙ∈Ｙ：ｔｈｅｒｅｅｘｉｓｔｓａｓｅｑｕｅｎｃｅ（ｘｎ）ｉｎＸｗｉｔｈｘｎ０ａ...     

关于Lipschitz强增生算子的迭代程序

本文在一般的Ｂａｎａｃｈ空间中讨论Ｌｉｐｓｃｈｉｔｚ强增生算子方程解和严格伪压缩算子不动点的迭代逼近问题．我们的结果统一和推广了Ｄｅｎｇ，Ｌｉｕ，Ｔａｎ和Ｘｕ的结果，完整地回答了Ｃｈｉｄｕｍｅ提出的公开问题．     

广义正交分解定理与Tseng度量广义逆

本文将Banach空间中广义正交分解定理从线性子空间拓广至非线性集—太阳集,分别给出了一算子为度量投影算子和一度量投影算子为有界线性算子的充要条件;得到了判别Banach空间中子空间广义正交可补的充要条件;建立了王玉文和季大琴(2000年)新近引入的Banach空间中的线性算子的Tseng度量广义逆存在的特征刻划条件;这些工作本质地把王玉文等人的新近结果从自反空间拓广至非自反空间的情形.     

METRIC GENERALIZED INVERSE OF LINEAR OPERATOR IN BANACH SPACE＊＊＊

The Moore-Penrose metric generalized inverse T of linear operator T in Banach space is systematically investigated in this paper. Unlike the case in Hilbert space, even T is a linear operator in Banach Space, the Moore-Penrose metric generalized inverse T is usually homogeneous and nonlinear in general. By means of the methods of geometry of Banach Space, the necessary and sufficient conditions for existence, continuitv, linearity and minimum property of the Moore-Penrose metric generalized inverse T will be given, and some properties of T will be investigated in this paper.     

Metric generalized inverse for linear manifolds and extremal solutions of linear inclusion in Banach spaces

Let X,Y be Banach spaces and M a linear manifold in X×Y={{x,y}∣x∈X,y∈Y}. The central problem which motivates many of the concepts and results of this paper is the problem of characterization and construction of all extremal solutions of a linear inclusion y∈M(x). First of all, concept of metric operator parts and metric generalized inverses for linear manifolds are introduced and investigated, and then, characterizations of the set of all extremal or least extremal solutions in terms of metric operator parts and metric generalized inverses of linear manifolds are given by the methods of geometry of Banach spaces. The principal tool in this paper is the generalized orthogonal decomposition theorem in Banach spaces.     

Perturbations of Moore–Penrose Metric Generalized Inverses of Linear Operators in Banach Spaces

In this paper,the perturbations of the Moore–Penrose metric generalized inverses of linear operators in Banach spaces are described.The Moore–Penrose metric generalized inverse is homogeneous and nonlinear in general,and the proofs of our results are different from linear generalized inverses.By using the quasi-additivity of Moore–Penrose metric generalized inverse and the theorem of generalized orthogonal decomposition,we show some error estimates of perturbations for the singlevalued Moore–Penrose metric generalized inverses of bounded linear operators.Furthermore,by means of the continuity of the metric projection operator and the quasi-additivity of Moore–Penrose metric generalized inverse,an expression for Moore–Penrose metric generalized inverse is given.     

Banach空间中线性算子的(集值)度量广义逆的表示及应用

在Banach空间Y无自反和从Banach空间X到Y的线性算子T无闭值域和稠定的假定下,利用Banach空间几何方法证明了Banach空间中线性算子的度量广义逆是具有闭凸值的集值映射,建立了该度量广义逆的存在性、唯一性和等价表达式,并给出了此表达式的一个应用示例．所得的部分结果本质地拓广王玉文和潘少荣在Banach空间Y自反,从X到Y的线性算子T为闭值域和稠定的假定下的近期相应结果．     

Banach空间中度量广义逆的乘积扰动

设X,Y为自反严格凸Banach空间.记A∈B(X,Y)为具有闭值域R(A)的有界线性算子,有界线性算子T=EAF∈B(X,Y)为A的乘积扰动.本文研究了有界线性算子A的Moore-Penrose度量广义逆的乘积扰动.在值域R(A)为α阶一致强唯一和零空间N(A)为β阶一致强唯一的条件下.给出了‖T~M-A~M‖的上界估计,作为应用,我们在L~p空间上讨论了Moore-Penrose度量广义逆的乘积扰动.     

集值度量广义逆的存在性

设X,Y为Banach空间,T∈L(X,Y)为从X到Y的线性算子,D(T),N(T),R(T)分别为T的定义域,核空间与值域,使用算子T的自身性质,给出T具有集值度量广义逆T和R(T)D(T)的充分必要条件.     

Perturbation Analysis of Moore–Penrose Quasi-linear Projection Generalized Inverse of Closed Linear Operators in Banach Spaces

In this paper, we investigate the perturbation problem for the Moore–Penrose bounded quasi-linear projection generalized inverses of a closed linear operaters in Banach space. By the method of the perturbation analysis of bounded quasi-linear operators, we obtain an explicit perturbation theorem and error estimates for the Moore–Penrose bounded quasi-linear generalized inverse of closed linear operator under the T-bounded perturbation, which not only extend some known results on the perturbation of the oblique projection generalized inverse of closed linear operators, but also extend some known results on the perturbation of the Moore–Penrose metric generalized inverse of bounded linear operators in Banach spaces.     

A NEW PERTURBATION THEOREM FOR MOORE-PENROSE METRIC GENERALIZED INVERSE OF BOUNDED LINEAR OPERATORS IN BANACH SPACES

In this paper,we investigate a new perturbation theorem for the Moore-Penrose metric generalized inverses of a bounded linear operator in Banach space. The main tool in this paper is "the generalized Neumann lemma" which is quite different from the method in [12] where "the generalized Banach lemma" was used. By the method of the perturbation analysis of bounded linear operators,we obtain an explicit perturbation theorem and three inequalities about error estimates for the Moore-Penrose metric generalized inverse of bounded linear operator under the generalized Neumann lemma and the concept of stable perturbations in Banach spaces.     

Linear boundary value problems for normally solvable operator equations in a Banach space

We consider linear boundary value problems for operator equations with generalized-invertible operator in a Banach or Hilbert space. We obtain solvability conditions for such problems and indicate the structure of their solutions. We construct a generalized Green operator and analyze its properties and the relationship with a generalized inverse operator of the linear boundary value problem. The suggested approach is illustrated in detail by an example.