论文信息 - JORDAN CANONICAL FORM OF A PARTITIONED COMPLEX MATRIX AND ITS APPLICATION TO REAL QUATERNION MATRICES

JORDAN CANONICAL FORM OF A PARTITIONED COMPLEX MATRIX AND ITS APPLICATION TO REAL QUATERNION MATRICES

Let Σ be the collection of all 2n × 2n partitioned complex matrices where A 1 and A 2 are n × n complex matrices, the bars on top of them mean matrix conjugate. We show that Σ is closed under similarity transformation to Jordan (canonical) forms. Precisely, any matrix in Σ is similar to a matrix in the form J ⊕ ∈ Σ via an invertible matrix in Σ, where J is a Jordan form whose diagonalelements all have nonnegative imaginary parts. An application of this result gives the Jordan form of real quaternion matrices.

Yimin Wei | Fuzhen Zhang | Fuzhen Zhang | Yimin Wei | Yimin Wei

[1] Louise A. Wolf. Similarity of matrices in which the elements are real quaternions , 1936 .

[2] N. Wiegmann,et al. Some Theorems On Matrices With Real Quaternion Elements , 1955, Canadian Journal of Mathematics.

[3] Peter Lancaster,et al. The theory of matrices , 1969 .

[4] Paul M. Cohn,et al. Skew field constructions , 1973 .

[5] F. R. Gantmakher. The Theory of Matrices , 1984 .

[6] Charles R. Johnson,et al. Matrix analysis , 1985, Statistical Inference for Engineers and Data Scientists.

[7] Wasin So,et al. The Numerical Range of Normal Matrices with Quaternion Entries , 1994 .

[8] S. Adler,et al. Quaternionic quantum mechanics and quantum fields , 1995 .

[9] Fuzhen Zhang. Quaternions and matrices of quaternions , 1997 .

[10] J. P. Ward. Quaternions and Cayley Numbers , 1997 .

[11] Fuzhen Zhang. Matrix Theory: Basic Results and Techniques , 1999 .