In chapter two, it includes some impontant forms of sign pattern matrix inertias and research trends of inertia.
第二章介绍符号模式矩阵的惯量所具有的几类重要形式以及惯量研究的动态。
Based on the spectral set of skew-symmetric matrix, the result that a class sign pattern matrix with zero diagonal is unique inertia was proved by using orthogonal similarity transformation.
本文基于反对称矩阵的谱集,采用正交相似变换,得到一类具有零对角的符号模式矩阵具有唯一惯量的结论。
Therefore an extreme of any kind in the persona of the ascending initiate moving to 3000 strands is a sign or symptom of electrical matrix ascension rather than a magnetic ascension.
因此,在前往3000股提升的人们中,任何一种极端的人格,都将是电性矩阵提升的标志或迹象,而不是一个磁性提升。
The sign pattern matrix class of a is defined by the set of all real matrixes those sign pattern is a.
的符号模式矩阵类定义为符号模式为A的所有实矩阵的集合。
With the affirming and denying degree to the trouble, sets up fuzzy matrix of screening according to trouble sign, thus diagnose the vibration trouble of rotatory machinery.
根据故障征兆对故障的肯定和否定程度,建立模糊筛选矩阵,从而对旋转机械的振动故障进行诊断。
The methods of sign test and runs number test of negligence error and adjustment of experimental covariance matrix are given in the work.
给出了检验疏失误差是否存在的符号检验法和游程数检验法。并给出了存在疏失误差时如何调整实验数据协方差矩阵的方法。
The sign pattern matrix originated some issues in the economics of the qualitative nature of the study.
符号模式矩阵最早起源于经济学中对某些问题的定性性质的研究。
I discuss idempotent, generalized inverses of general sign pattern matrix.
讨论了一般符号模式矩阵的幂等性和广义逆。
I analyse some conclusions of spectrum arbitrary and give two sign patterns. then I prove two classes sign pattern matrix that are spectrally arbitrary using Nilpotent-Jacobi method.
分析了谱任意的相关结论并给出了两类符号模式,然后运用幂零雅可比方法证明了两类符号模式矩阵的谱任意性。
The study of sign stability of a real square matrix has important applications in various areas such as economics, ecology, and so on.
一个实矩阵的符号稳定性问题在经济学、生态学等诸多领域中都有应用背景。
A square real matrix a is called an S2NS matrix, if every matrix with the same sign pattern as a is invertible, and the inverses of all such matrices have the same sign pattern.
一个实方阵a称为是S2NS阵,若所有与A有相同符号模式的矩阵均可逆,且它们的逆矩阵的符号模式都相同。
In the chapter 2, the author introduce two methods that method a sign pattern matrix is spectrally arbitrary, the structure method and Nilpotent-Jacobi method with examples.
第二章通过举例介绍了两种证明符号模式矩阵是谱任意的方法——构造法和幂零-雅可比方法。
In the chapter 1, the author introduce the history of development and the related knowledge of the sign pattern matrix, and the main results of the paper.
第一章主要是介绍符号模式矩阵的研究历史与相关基本概念,本文结论。
The matrix theory of sign patterns mainly studies its qualitative nature of the sign pattern which is only about its elements.
符号模式矩阵理论主要研究矩阵的仅与其符号模式有关的定性性质。
The paper proved the Hamilton-Cayley theorem in complex number space, and indicated the all matrix root of the sign multinomial of matrix A.
本文在复数域上证明了哈密尔顿-凯莱定理,并给出方阵A的特征多项式的全部矩阵根。
The traditional mark printing method has metal electricity India and the matrix stamping and so on, now uses the laser to hit the sign and air operated hits the sign way.
传统的标记打印方法有金属电印和字模压印等,现在广范采用激光打标与气动打标方式。
The origin of sign pattern matrix is lies in study of sign-stability and sign-solvability of linear system. It was first proposed by p.
符号模式矩阵的研究起源于研究线性系统的符号稳定性与符号可解性,是由P。
The item that an athlete will attend we can sign as 1, otherwise as 0. Then the table of the enrolled can be looked as a matrix, which only contains element 0 and 1.
即把运动员参加的项目记作1,把未参加的项目记为0,这样把运动员报名表转化成为一个0 - 1矩阵。
The item that an athlete will attend we can sign as 1, otherwise as 0. Then the table of the enrolled can be looked as a matrix, which only contains element 0 and 1.
即把运动员参加的项目记作1,把未参加的项目记为0,这样把运动员报名表转化成为一个0 - 1矩阵。
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