加权移位算子是次正常算子的条件

以广义逆为工具运用算子演算给出加权移位算子是次正常算子的条件,所用方法不同于 Ｓｔａｍｐｆｌｉ的工作,但结果一致．作为应用给出了两个例子．     

四参数区间数调和平均算子及其决策应用北大核心

将三参数区间数有序加权调和平均算子(CP-OWHA)推广到四参数区间数,提出了四参数区间数有序加权调和平均算子(CFP-OWHA),在此基础上定义了四参数区间数组的加权调和CFP-OWHA算子、有序加权调和CFP-OWHA算子、组合CFP-OWHA算子以及广义加权调和CFP-OWHA算子、广义有序加权调和CFP-OWHA算子和广义组合CP-OWHA算子,并探讨了它们的一些性质。然后,提出了基于四参数区间数调和平均算子的决策方法.最后,通过实例说明了决策方法的可行性。     

四参数区间数调和平均算子及其决策应用

将三参数区间数有序加权调和平均算子(CP-OWHA)推广到四参数区间数,提出了四参数区间数有序加权调和平均算子(CFP-OWHA),在此基础上定义了四参数区间数组的加权调和CFP-OWHA算子、有序加权调和CFP-OWHA算子、组合CFP-OWHA算子以及广义加权调和CFP-OWHA算子、广义有序加权调和CFP-OWHA算子和广义组合CP-OWHA算子,并探讨了它们的一些性质。然后,提出了基于四参数区间数调和平均算子的决策方法.最后,通过实例说明了决策方法的可行性。     

分块算子矩阵的加权EP

本文在加权广义Schur补的基础上, 引入并研究了Hilbert空间上分块算子矩阵的加权Moore-Penrose逆和加权EP. 进一步, 给出了加权EP算子在算子方程中的一个应用.     

基于IOWC-GOWMA算子和指数支撑度的区间型组合预测模型北大核心

将连续区间的广义有序加权多重平均(C-GOWMA)算子和诱导有序加权平均(IOWA)算子相结合,提出一种新的诱导有序加权连续区间广义有序加权多重平均(IOWC-GOWMA)算子,该算子同时考虑区间数自身、数据位置两个因素,可以将区间数转换成实参数,进一步构建基于IOWC-GOWMA算子和指数支撑度的区间型组合预测模型。最后通过实例分析说明该区间组合预测模型的合理性和有效性,并对参数进行了详细的灵敏度分析。     

三参数区间数集成算子及决策应用

研究了三参数区间数信息集成算子及其在决策中的应用.首先,给出了三参数区间数的有序加权CP-OWA算子、有序加权CP-OWG算子及广义有序加权CP-OWA算子和广义有序加权CP-OWG算子的概念,并初步探讨了它们的性质,推广了相关文献中的三参数区间数加权CP-OWA算子和加权CPOWG算子.然后,通过方案三参数区间数属性值的可能度得到方案属性值可能度矩阵,进而根据可能度矩阵的排序向量实现方案三参数区间数属性值的排序,并通过文中定义的三参数区间数信息集成算子进行信息集成,实现方案排序择优.     

直觉不确定语言Frank集结算子及其应用

基于直觉不确定语言变量和Frank算子,提出了直觉不确定语言Frank集结算子的概念,给出了直觉不确定语言Frank集结算子的运算规则、期望函数、大小比较方法;定义了直觉不确定语言Frank加权算术平均算子、加权几何平均算子、有序加权算术平均算子、有序加权几何平均算子、广义加权平均算子以及算子具有的幂等性、单调性、有界性等性质.并基于这些算子提出两种属性权重确知且属性值以直觉不确定语言形式给出的决策方法,最后通过实例验证了方法的可行性.     

不确定隶属度语言Einstein算子及其应用

在不确定隶属度语言变量和Einstein算子的基础上,提出了一种新的算子—不确定隶属度语言Einstein算子,并将其应用到多属性群决策中.首先定义了不确定隶属度语言Einstein算子的概念、相应的运算规则、大小比较方法.之后提出了几种新的不确定隶属度语言Einstein算子,比如:不确定隶属度语言Einstein加权算术平均算子(UMLEWA)、不确定隶属度语言Einstein加权几何平均算子(UMLEWG)、不确定隶属度语言Einstein有序加权算术平均算子(UMLEOWA)、不确定隶属度语言Einstein有序加权几何平均算子(UMLEOWG)、广义不确定隶属度语言Einstein加权算术平均算子(GUMLEWA)、广义不确定隶属度语言Einstein加权几何平均算子(GUMLEWG),以及算子的相应性质(幂等性,有界性,单调性),并证明了性质的正确性.其次在不确定隶属度语言Einstein加权算术平均算子(UMLEWA)和不确定隶属度语言Einstein加权几何平均算子(UMLEWG)基础上,提出了两种不同的方法来处理多属性群决策问题,并给出了具体的群决策步骤.最后,通过实例验证了所提方法的有效性和可行性.     

广义Calderón Zygmund算子及其加权模不等式

本文推广Coifman和Meyer的Calderon-Zygmund算子概念,定义了M-型和θ-型广义Calderon-Zygmund算子,证明了它们的L~p有界性。然后对θ-型Calde-ron-Zygmund算子证明L~p加权模不等式。由于θ-型Calderon-Zygmund算子的广泛性,这就不但对已有的一些算子的加权模不等式给出了新的证明,同时还得到了一系列新的结果,其中包括各种类型的伪微分算子和交换子的加权模不等式。接着讨论具有较高阶光滑性条件的C~N-型Calderon-Zygmund算子,得到H~p到L~p有界性结果。最后通过把Calderon-Zygmund算子推广到向量值函数,并借助Little-wood-Paley理论,对Caifman和Meyer的一类广义伪微分算子和Meyer的一类广义伪微分算子得到加权模不等式。     

面积积分及其交换子在广义加权Morrey空间上的有界性

研究含有参变量的面积积分及其与BMO函数构成的高阶交换子在广义加权Morrey空间上的估计,利用函数的局部加权估计,证明了面积积分及其高阶交换子在广义加权Morrey空间上是有界算子.这些结果改进和丰富了一些已有的研究结论.     

The mixed-type reverse order laws for weighted generalized inverses of a triple matrix product

In this paper, we study a group of mixed-type reverse order laws for weighted generalized inverses of a triple matrix product by using the maximal and minimal ranks of the generalized Schur complement. The necessary and sufficient conditions for this group of mixed-type reverse order laws are presented.     

Reverse order law for generalized inverses of multiple operator product

In this paper, we consider the reverse order law for generalized inverses of operators on Hilbert spaces. We derive necessary and sufficient conditions for various inclusions concerning the reverse order law for generalized inverses of multiple operator product. We extend the finite dimensional results from (Wei M. Reverse order laws for generalized inverses of multiple matrix products. Linear Algebra Appl. 1999;293:13.) to infinite dimensional settings.     

Reverse order laws for the weighted generalized inverses

In this paper, we offer new necessary and sufficient conditions for the reverse order laws to hold for the weighted generalized inverses of matrices.     

Weighted weak group inverse for Hilbert space operators

We present the weighted weak group inverse, which is a new generalized inverse of operators between two Hilbert spaces, and we extend the notation of the weighted weak group inverse for rectangular matrices. Some characterizations and representations of the weighted weak group inverse are investigated. We also apply these results to define and study the weak group inverse for a Hilbert space operator. Using the weak group inverse, we define and characterize various binary relations.     

Reverse order laws in C-algebras

In this paper, we offer purely algebraic necessary and sufficient conditions for reverse order laws for generalized inverses in C^∗-algebras, extending rank conditions for matrices and range conditions for Hilbert space operators.     

Inner Generalized Inverses with Prescribed Idempotents

We define and characterize inner generalized inverses with prescribed idempotents. These classes of generalized inverses are natural algebraic extension of generalized inverses of linear operators with prescribed range and kernel. We consider the reverse order rule for inner generalized inverses of elements of a ring, some perturbation bounds, and we construct an iterative method for computing a (p, q)-inner inverse in Banach algebras.     

On the product of projectors and generalized inverses

We consider generalized inverses of linear operators on arbitrary vector spaces and study the question when their product in reverse order is again a generalized inverse. This problem is equivalent to the question when the product of two projectors is again a projector, and we discuss necessary and sufficient conditions in terms of their kernels and images alone. We give a new representation of the product of generalized inverses that does not require explicit knowledge of the factors. Our approach is based on implicit representations of subspaces via their orthogonals in the dual space. For Fredholm operators, the corresponding computations reduce to finite-dimensional problems. We illustrate our results with examples for matrices and linear ordinary boundary problems.     

RESEARCHES ON INVERSE ORDER RULE FOR WEIGHTED GENERALIZED INVERSE

1 Inttoductlon and Preliminary KnowledgeThe generalized inverse is an important tool for researching the singular matrix problems,ac-POSed problems, optimication and statistics problems. The inverse order rule for generalizedinverse playS an forportant role on the theoretical research and numerical computations in theOf generaled inverse is(see [2) [6][8j). Another sufficient and neceSSary condition isIn this paper we generalize the above resultS to the case of the weighted generalized inv…     

Weighted core–EP inverse of an operator between Hilbert spaces

We introduce and study the weighted core–EP inverse of an operator between two Hilbert spaces as a generalization of the weighted core–EP inverse for a rectangular matrix. Several new properties of weighted core–EP inverses are given and some known results are extended. Using a weighted operator, the core–EP pre-order and the minus partial order of corresponding operators, we define new pre-orders on the set of all Wg–Drazin invertible operators between two Hilbert spaces. As consequences of our results, we present a new characterization and new representations of the core–EP inverse, new characterizations of the core–EP pre-order and extend the core–EP pre-order to a partial order.     

关于$\{1,3,4\}$-逆的混合逆序律

In this paper, we study the mixed-type reverse order laws to {1, 3, 4}-inverses for closed range operators A, B and AB. It is shown that B{1, 3, 4}A{1, 3, 4} ?(AB){1, 3} if and only if R(A*AB) ? R(B). For every A(134)∈ A{1, 3, 4}, it has(A(134)AB){1, 3, 4}A{1, 3, 4} =(AB){1, 3, 4} if and only if R(AA*AB) ? R(AB). As an application of our results, some new characterizations of the mixed-type reverse order laws associated to the Moore-Penrose inverse and the {1, 3, 4}-inverse are established.