Note on determinant inequalities of generalized positive definite matrices 关于广义正定矩阵行列式不等式的注记
The positive subdefinite and semipositive subdefinite solutions of matrix equation ax 半正定二次型及半正定矩阵
Perturbation analysis on symmetric indefinite and generalized semi - positive matrices 关于对称不定和广义半正定矩阵的扰动分析
Solvability conditions for the inverse problem of a class of general semipositive subdefinite matrix 一类广义亚半正定矩阵反问题有解的条件
Results linear complementary problem have unique solution when m is generalized positive definite matrix 结果得到了当m是广义正定矩阵时,线性互补问题存在唯一解。
This paper gives some properties and equivalence conditions about subpositive definite matrix , then them were proved 摘要文章给出了亚正定矩阵的一些性质、等价命题及其证明。
In this paper , we ' ll give another simple method to seek normal orthogonal basis by using the properties of positive definite matrix 摘要利用正定矩阵的性质,得到标准正交基的另一种较简单的求法。
Aim to solve question about the existence and uniqueness of the solution for linear complementary by using generalized positive definite matrix 摘要目的解决用广义正定矩阵来判别线性互补解的存在唯一性问题。
We extend the determinant inequality of generalized real positive definite matrices that is advanced by paper [ 3 ] . moreover we give its convex inequality 摘要推广了文献[ 3 ]中的广义实正定矩阵的行列式不等式,同时给出了广义实正定矩阵的凸性不等式。
Further extended is the definition of the positive definite matrix . thus obtained is the non - symmetrical generatized positive definite matrice and some of its results 摘要对常规的正定矩阵的定义进行了再推广,由此得出非对称的广义正定矩阵及一些结果。
