AbstractWe produce an explicit Hermitian canonical form for complex square matrices under consimilarity. We apply a simple algorithmic procedure to a concanonical form for complex matrices to construct a form that is not only canonical but also Hermitian. We also show that a similar algorithmic procedure can be used to produce an explicit real canonical form for complex matrices under consimilarity
AbstractLet A1, A2 be given n-by-n Hermitian or symmetric matrices, and consider the simultaneous tr...
AbstractWe study the properties of skew-coninvolutory (EE¯=-I) matrices, and derive canonical forms ...
AbstractThe general form of a continuous mapping φ acting on the real vector space of all n × n comp...
AbstractWe produce an explicit Hermitian canonical form for complex square matrices under consimilar...
AbstractSquare complex matrices A, B are said to be consimilar if A=SBS̄−1 for some nonsingular matr...
AbstractLet Mn denote the set of n-by-n complex matrices. Two matrices A,B ∈ Mn are said to be ϕ-equ...
AbstractTwo square complex matrices A, B are said to be unitarily congruent if there is a unitary ma...
AbstractWe study the Jordan Canonical Forms of complex orthogonal and skew-symmetric matrices, and c...
AbstractWe consider the class of normal complex matrices that commute with their complex conjugate. ...
AbstractThis paper discusses consimilarity of quaternion matrices, obtains the Jordan canonical form...
AbstractA square matrix is nonderogatory if its Jordan blocks have distinct eigenvalues. We give can...
AbstractA canonical form and a complete set of invariants are obtained for the simultaneous reductio...
AbstractIt is shown that Cauchy matrices admit a confluent extension in much the same way that confl...
AbstractWe call A∈Mn(C) a condiagonalizable matrix if AR=AA¯ (or, which is the same, AL=A¯A) is diag...
AbstractA given square complex matrix C is the product of a positive semidefinite matrix A and a Her...
AbstractLet A1, A2 be given n-by-n Hermitian or symmetric matrices, and consider the simultaneous tr...
AbstractWe study the properties of skew-coninvolutory (EE¯=-I) matrices, and derive canonical forms ...
AbstractThe general form of a continuous mapping φ acting on the real vector space of all n × n comp...
AbstractWe produce an explicit Hermitian canonical form for complex square matrices under consimilar...
AbstractSquare complex matrices A, B are said to be consimilar if A=SBS̄−1 for some nonsingular matr...
AbstractLet Mn denote the set of n-by-n complex matrices. Two matrices A,B ∈ Mn are said to be ϕ-equ...
AbstractTwo square complex matrices A, B are said to be unitarily congruent if there is a unitary ma...
AbstractWe study the Jordan Canonical Forms of complex orthogonal and skew-symmetric matrices, and c...
AbstractWe consider the class of normal complex matrices that commute with their complex conjugate. ...
AbstractThis paper discusses consimilarity of quaternion matrices, obtains the Jordan canonical form...
AbstractA square matrix is nonderogatory if its Jordan blocks have distinct eigenvalues. We give can...
AbstractA canonical form and a complete set of invariants are obtained for the simultaneous reductio...
AbstractIt is shown that Cauchy matrices admit a confluent extension in much the same way that confl...
AbstractWe call A∈Mn(C) a condiagonalizable matrix if AR=AA¯ (or, which is the same, AL=A¯A) is diag...
AbstractA given square complex matrix C is the product of a positive semidefinite matrix A and a Her...
AbstractLet A1, A2 be given n-by-n Hermitian or symmetric matrices, and consider the simultaneous tr...
AbstractWe study the properties of skew-coninvolutory (EE¯=-I) matrices, and derive canonical forms ...
AbstractThe general form of a continuous mapping φ acting on the real vector space of all n × n comp...