Eigenvalues and Jordan Forms of Dual Complex Matrices
Liqun Qi , Chunfeng Cui
Communications on Applied Mathematics and Computation ›› 2023, Vol. 7 ›› Issue (4) : 1225 -1241.
Eigenvalues and Jordan Forms of Dual Complex Matrices
Dual complex matrices have found applications in brain science. There are two different definitions of the dual complex number multiplication. One is noncommutative. Another is commutative. In this paper, we use the commutative definition. This definition is used in the research related with brain science. Under this definition, eigenvalues of dual complex matrices are defined. However, there are cases of dual complex matrices which have no eigenvalues or have infinitely many eigenvalues. We show that an dual complex matrix is diagonalizable if and only if it has exactly n eigenvalues with n appreciably linearly independent eigenvectors. Hermitian dual complex matrices are diagonalizable. We present the Jordan form of a dual complex matrix with a diagonalizable standard part, and the Jordan form of a dual complex matrix with a Jordan block standard part. Based on these, we give a description of the eigenvalues of a general square dual complex matrix.
Dual complex numbers / Matrices / Eigenvalues / Diagonalization / Jordan form
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Shanghai University
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