证明并给出一种构造可对角化矩阵的相似逆变换矩阵的新方法。
This paper proves and provides a new method for constructing the similarity inverse transformation matrices of diagonalization matrix.
本文研究了四元数量子力学中一类要求其解是正规或可对角化四元数矩阵的特征值反问题。
One kind of inverse eigenvalue problems, whose solutions are required to be normal or diagonalizable matrices, is investigated in quaternionic quantum mechanics.
最后让明了块复合矩阵可对角化的一个充要条件。
Finally, a sufficient and necessary condition of the diagonalizable block compound matrices is proved.
本文给出矩阵可对角化的一个充要条件。
In this paper we give a necessary and sufficient condition on diagonalization matrix.
引入弱可逆矩阵,并用它来刻画矩阵可对角化的充要条件。
This paper introduces the weak invertiable matrix and characterizes the conditions of diagonalization of a matrix by using weak invertiable matrix.
引入弱可逆矩阵,并用它来刻画矩阵可对角化的充要条件。
This paper introduces the weak invertiable matrix and characterizes the conditions of diagonalization of a matrix by using weak invertiable matrix.
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