共查询到17条相似文献,搜索用时 78 毫秒
1.
2.
本文应用子式讨论交换环上矩阵的Drazin逆和群逆,给出了矩阵A的Drazin逆和群逆的整体和单个元素的表达式. 相似文献
3.
给出了环R上幂等矩阵P,Q满足不同条件:(1)PQP=0;(2)PQP=PQ;(3)PQ=QP;(4)PQP=P时P+aQ的Drazin逆的表达式,推广了一些已有的结论. 相似文献
4.
关于环上矩阵的群逆与Drazin逆 总被引:4,自引:2,他引:4
本文给出了环上一类方阵有群逆,{1,5}-道的充要条件及其它们的表式,推广了体(域)上关于群逆的Cline定理.此外还首次得到了矩阵有Drazin逆的判别准则及其它的表式. 相似文献
5.
本文给出了L-零矩阵的广义Bott-Duffin逆及矩阵的加权Drazin逆的若干性质及表达形式. 相似文献
6.
7.
8.
设C 是加法范畴, 态射φ,η: X→ X 是C上的态射. 若φ,η 具有Drazin逆且φη =0, 则φ+η 也具有Drazin逆. 若φ具有Drazin逆φD 且1X+φDη 可逆, 作者讨论f =φ+η 的Drazin逆( 群逆)并且给出 f D(f #}=(1X+φDη)-1φD的充分必要条件. 最后, 把Huylebrouck的结果从群逆推广到了Drazin逆. 相似文献
9.
态射的Drazin逆 总被引:10,自引:1,他引:10
本文研究范畴中态射的Drazin逆.给出了一般范畴中态射的{1m,2,5}逆的一个等价刻划.在Abel范畴中,建立指数与Drazin逆的概念,证明了有Drazin逆的态射必有柱心-幂零分解. 相似文献
10.
加法范畴中态射的Drazin逆 总被引:4,自引:0,他引:4
本文研究了加法范畴上态射的Drazin逆。首先给出了态射和φ η与态射φ有Drazin逆的一个关系,得到了φ η的Drazin逆的一个公式,其次证明了态射φ有Drazin逆当且仅当φ^k有群逆(k为某一正整数)。最后还证明了:如果2为可逆态射,则具有Drazin逆的态射一定为两个可逆态射之和。 相似文献
11.
高璟 《数学的实践与认识》2007,37(7):125-128
利用矩阵A的带W权Drazin逆的一个性质特征,对任意的矩阵A∈Cm×n,W∈Cn×m,建立了带W权的Drazin逆Ad,w的一种新的表示式,给出了具体的算法步骤,并且在文末给出了算例. 相似文献
12.
Let ■ be a pre-additive category. Assume that ψ:X→X is a morphism of (?). In this paper, we give the necessary and sufficient conditions for ψ to have the Drazin inverse by using the von Neumann regular inverse for the ψk, and extend a result by Puystjens and Hartwig from the group inverse to Drazin inverse. 相似文献
13.
It is known that the existence of the group inverse a
# of a ring element a is equivalent to the invertibility of a
2
a
− + 1 − aa
−, independently of the choice of the von Neumann inverse a
− of a. In this paper, we relate the Drazin index of a to the Drazin index of a
2
a
− + 1 − aa
−. We give an alternative characterization when considering matrices over an algebraically closed field. We close with some
questions and remarks.
相似文献
14.
Guifen Zhuang Dragana S. Cvetković-Ilić Yimin Wei 《Linear and Multilinear Algebra》2013,61(8):903-910
In this article, we investigate additive properties on the Drazin inverse of elements in rings. Under the commutative condition of ab?=?ba, we show that a?+?b is Drazin invertible if and only if 1?+?a D b is Drazin invertible. Not only the explicit representations of the Drazin inverse (a?+?b) D in terms of a, a D , b and b D , but also (1?+?a D b) D is given. Further, the same property is inherited by the generalized Drazin invertibility in a Banach algebra and is extended to bounded linear operators. 相似文献
15.
In order to estimate error bounds on the computed Drazin inverse of a matrix, we need to establish some perturbation theory for the Drazin inverse which is analogous to that for the Moore–Penrose inverse. In this paper, we present recent results on this topic, three problems are put forward in this direction. 相似文献
16.
Let (A) be a complex Banach algebra and J be the Jacobson radical of(A).(1) We firstly show that a is generalized Drazin invertible in (A) if and only if a+J is generalized Drazin invertible in (A)/J.Then we prove that a is pseudo Drazin invertible in (A) if and only if a + J is Drazin invertible in (A)/J.As its application,the pseudo Drazin invertibility of elements in a Banach algebra is explored.(2) The pseudo Drazin order is introduced in (A).We give the necessary and sufficient conditions under which elements in (A) have pseudo Drazin order,then we prove that the pseudo Drazin order is a pre-order. 相似文献
17.
In this paper,we give further results on the Drazin inverse of tensors via the Einstein product.We give a limit formula for the Drazin inverse of tensors.By using this formula,the representations for the Drazin inverse of several block tensor are obtained.Further,we give the Drazin inverse of the sum of two tensors based on the representation for the Drazin inverse of a block tensor. 相似文献