Especially, proved that almost all matrices were similar to diagonal matrices.
特别证明了:在复数域上,几乎所有矩阵都与对角阵相似。
Strang s analysis applies to so-called banded matrices. Most of the Numbers in a banded matrix are zeroes; the only exceptions fall along diagonal bands, at or near the central diagonal of the matrix.
Strang的分析被应用于所谓的带状矩阵上;带状矩阵的绝大多数项都是0;唯一的例外是矩阵中心或靠近矩阵中心的对角带。
Eigenvalues of diagonal and triangular matrices, similarity transforms, calculation of eigenvalues from QR decomposition, iteratively estimating the leading eigenvalue.
对角矩阵及三角矩阵之特征值,相似矩阵,由QR分解计算特征值,主特征值之迭代估算。
The simultaneous models were recognizable and their error structure matrices were not diagonal.
该模型是可识别且误差结构矩阵不是对角矩阵的联立方程组模型。
A concept of symmetric diagonal A-factor block circulant matrices and some of their prop- crtics are given, the main theorems are extended.
给出了对称对角A-因子循环分块矩阵的概念,讨论了它的一些性质,推广了几个主要定理.。
We introduced the concept of block directed edge cover diagonal quasi dominant matrix, obtained a new nonsingularity criteria for matrices and distribution theorem on eigenvalues of matrix.
引进了拟块有向边覆盖对角占优矩阵概念,给出了新的矩阵非奇异判定定理和特征值分布定理。
This paper USES a new method to determine the diagonal elements of the matrices.
对于对角线元素,本文使用了一个新的方法予以确定。
We show that every regular matrix over exchange ideals admits a diagonal reduction by full matrices.
证明置换理想上的正则矩阵可以通过满矩阵对角化。
Stability problem of a class of switched linear systems is studied, of which the subsystem matrices are in diagonal canonical or Jordan canonical forms.
研究了一类在循环切换律下,子系统含有状态时滞的离散时间线性切换系统的稳定性和子系统驻留时间确定的问题。
Stability problem of a class of switched linear systems is studied, of which the subsystem matrices are in diagonal canonical or Jordan canonical forms.
研究了一类在循环切换律下,子系统含有状态时滞的离散时间线性切换系统的稳定性和子系统驻留时间确定的问题。
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