摘要
实方阵A通过相似变换Q^(-1)AQ可化为约当标准形。本文提出求变换阵Q和约当形的一种方法。该方法概念简单,解法明确,易于理解,适于计算机求解。
A real square matrix A is changed into the Jordan canonical form by means of similarity transformation Q^(-1)AQ. This paper shows a method of transforming matrix into Jordam canonical form. The method has simple concepts, clear solving process and easy to understand and fit for solving by computer.
出处
《河北工学院学报》
1992年第3期104-114,共11页
Journal of Hubei Polytechnic University
关键词
相似变换
约当标准形
实方阵
矩阵
Similarity transformation, Eigenvalue, Eigenvector, Jordan canonical form, Jordan submatrix, Geometric multiplicity, Algebraic multiplicity, Rank of matrix, Zero of matrix.
