1) tolerance matrix
相容矩阵
1.
Some new concepts were defined such as indiscernibility relation of general decision,the indiscernibility classes,joint decision tolerance matrix and a fast computation algorithm was proposed for reduction and rule extraction based on joint decision matrix in incomplete decision systems.
提出了广义决策的不可分辨关系及其不可分辨类、联合决策相容矩阵等概念以及不完备决策系统中基于联合决策相容矩阵的约简和规则提取的快速矩阵算法。
2.
Towards the goal of reasonable weights\' configuration for individual rule or index,the Analytic Hierarchy Process(AHP),incomplete judgment mechanism,together with tolerance matrix method was introduced.
通过层次分析法、残缺判断矩阵处理机制和相容矩阵分析法,实现了设备故障实例各准则和指标权重的合理配置。
2) compatibility matrix
相容性矩阵
3) Analytic compatible matrix method
相容矩阵分析法
4) Consistently ordered matrix
相容次序矩阵
1.
The selection of the AOR optimum parameters for consistently ordered matrix;
相容次序矩阵AOR迭代的最优参数选取
2.
When the coefficient matrix is consistently ordered matrix with non-zero diagonal elements,sufficient and necessary condition of the convergence of SAOR iterative method is given in the case that all eigenvalues of its Jacobi matrix are pure imaginary numbers.
得到了当系数矩阵为对角元素非零的相容次序矩阵,且Jacobi迭代矩阵的特征值都是纯虚数时SAOR方法收敛的充要条件。
3.
In this paper,the convergence of AOR iterative was discussed when the coefficient matrix of linear system is a (1,1) consistently ordered matrix and the eigenvalues of Jacobi iterative matrix are complex numbers.
在此基础上,讨论了系数矩阵A为(1,1)相容次序矩阵、Jacobi迭代矩阵的特征值为复数时AOR迭代法的收敛情况,给出一个判定收敛的条件,扩充了A。
5) consistent matrix norm
相容矩阵范数
1.
Using three different kinds of consistent matrix norm, this paper provesthat all the complex roots of any unitary polynomial must be in the annulus range ofcomplex plane.
本文的主要结果是利用三种不同的相容矩阵范数,分别给出了任意一个一元n次多项式的所有复根必全都落在复平面的一个园环区域内。
6) contradictory matrix equation
不相容矩阵方程
1.
Least squares solution to the contradictory matrix equation AX = B;
不相容矩阵方程AX=B的最小二乘解
补充资料:ω相容性
ω相容性
onega - consistency 1? co- consistency
。相容性[佣梢,一目‘史狱y或。一co招is年n(刁;OMer:-肚nPOTHBo碘.B0c几」 算术形式系统的一种性质,表明不能得到。不相容性.田不相容性是形式系统的一种状况,指对某个公式A(x),无穷系列A(百),二,A(万),二中每个公式,以及公式二丫xA(x)都是可证明的,其中百是形式系统中一个常量代表数字O,而常量万是由(x)‘递归定义的,表示x的后继数:丽不万=(万)’. 。相容性这一概念是与算术的C位目不完全性定理(C往北1 incomPle~伍即比m)一起出现的.假设一个形式算术系统有。相容性,K .G议北l证明了这个系统的不完全性.田相容性这一性质比单纯的相容性(consisten卿)要强,只要公式A(x)中的x不出现就得到单纯的相容性.由G议无1不完全性定理就知道存在一个系统,它是相容的,但又是。不相容的.
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