讨论实完全反对称矩阵的一个特征值反问题。
In this paper, we present an inverse eigenvalue problem for real bi-antisymmetric matrices.
给出了实反对称矩阵的若干构建方法及部分方法的证明。
This paper demonstrates some methods of the building of the real antisymmetric matrix and some detailed demonstrate.
对称矩阵和反对称矩阵作为特殊矩阵无论在矩阵理论方面,还是在实际应用方面都有重要的意义。
However in studying the transpose of matrix much focus has been given on the definition of symmetric matrix and anti-symmetric matrix while their properties have not been fully explored.
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。
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.
根据两幅图像中的平面约束,证明了图像对的基础矩阵和同形矩阵的乘积具有反对称的性质。
According to the planar constraints, we proved that the product of the fundamental matrix and the homography matrix of an image pair is an antisymmetric matrix.
最后,在分块反对称反循环矩阵性质的基础上,给出了其特征值和特征多项式以及相似对角阵。
Finally, based on these characteristics, the eigenvalues and eigenvalues polynomials and its diagonal matrix were given.
非经典系统指在最一般的场合,这类系统的质量、阻尼和刚度矩阵都无对称或反对称性可言。
Non-classical systems mean that the mass, damping and stiffness matrix in non-classical system may be asymmetric matrices.
本文给出了广义对称(反对称)矩阵和广义正交矩阵的概念,讨论了它们的性质及相互之间的关系。
This paper defines the generalized symmetric matrix and orthogonal matrix and discusses their properties and relations between them.
该问题的系数矩阵同时具有反对称性和零块结构。
For the doubly structure, both skew-symmetric structure and zeroth structure are considered.
该问题的系数矩阵同时具有反对称性和零块结构。
For the doubly structure, both skew-symmetric structure and zeroth structure are considered.
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