摘要
研究了复矩阵的次正定性,得到了“n阶次正定复矩阵的次特征值实部为正”与“当JA为复正规矩阵时,A是次正定复矩阵的充分必要条件是A的次特征值实部为正”的结论,并在此基础上得到了矩阵是次正定复矩阵的一系列充分条件.
The properties of metapositive definite complex matrices are discussed. The paper includes theorems such as the one that the real parts of the sub - characteristic values belonged to an n - square metapositive definite complex matrix are positive,and that if JA is a normal composite matrix,then A is a meatpositive definite complex matrix if and only if the real part of the sub - characteristic proved that the matrix is a series of sufficient conditons of value belonged to A is real. On the conclusion paper has metapositive definite complex matrix.
出处
《湖北大学学报(自然科学版)》
CAS
北大核心
2005年第3期201-203,207,共4页
Journal of Hubei University:Natural Science
关键词
次转置矩阵
次正定次Hermite矩阵
次正定复矩阵
次特征值
sub - transpositive matrix
meta - hermite matrix
metapositive definite complex matrix
subcharacteristic value
