BANACH空间有界线性算子A~((2))_(T,S)的表示

In this paper we extends the results in [1],[2],[3] and [4] to bounded linear operators in Banach spaces using matrix expression of a partitioned operator. For existence of the limit lim λ→0 (λI + GA)~(-1) G and lim λ→0 G(λI + AG)~(-1) it is necessary and sufficient condition that bounded linear operators A~((2))_(T,S) exist in Banach spaces. We get the integral representation: A(2)_(T,S)=∫∞0 exp(-GAt)Gdt.     

闭算子Moore-Penrose逆的逆序律(英文)

In this paper, the reverse order law for the Moore-Penrose inverse of closed linear operators with closed range is investigated by virtue of the Norm-preserving extension of the bounded linear operators. The results generalize some results obtained by S Izumino in [12].     

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.     

BANACH空间有界线性算子A_(T,S)~((2))的表示

文中R(A),N(A)分别表示算子A的值域与核空间.设A是一个n×m的复矩阵,S,T分别是Cn,Cm中的子空间,G是m × n的复矩阵.称G是A的具有指定值域T及核空间S的广义逆,若R(G)=T,N(G)=S且GAG=G.满足这样条件的G是唯一的,记为G=A(2)T,S(参见文献[7]).由文献[7]可知A(2)T,S存在的充要条件是AT+S=Cn.由于具有指定值域与核空间的广义逆是许多广义逆的统一表示形式,因此对它的研究具有普遍意义.