Add to ORKGIntroduction: Although the results already have been published (partially) by Frobenius in 1910 (see [5]), these are still not very known to mathematicians. I even could not find them in modern textbooks on matrix theory or linear algebra. These results and their proofs (see [1] , [2], [3]) are not very accessible for non-mathematicians. But they need the results. Applications can be found in system theory and in problems in mechanics concerning systems of differential equations. The aim of this paper is to give elementary proofs as well as a clear summary of the conditions. The basis of all proofs is the Jordan normal form. As we will see: every square matrix (real or complex) is a product of two symmetric (real resp. complex) matrices. Ho...
In [C.R. Johnson, B. Kroschel, M. Omladic, Eigenvalue multiplicities in principal submatrices, Linea...
AbstractLet A and B be hermitian matrices with given eigenvalues (a1,…an) and (b1,…bn) respectively....
In [C.R. Johnson, B. Kroschel, M. Omladic, Eigenvalue multiplicities in principal submatrices, Linea...
Introduction: Although the results already have been published (partially) by Frobenius in 1910 (see...
This paper presents elementary proofs of the factorization of a square matrix into two hermitian or ...
This paper presents elementary proofs of the factorization of a square matrix into two hermitian or ...
Introduction: Although the results already have been published (partially) by Frobenius in 1910 (see...
This paper presents elementary proofs of the factorization of a square matrix into two hermitian or ...
This paper presents elementary proofs of the factorization of a square matrix into two hermitian or ...
AbstractNecessary and sufficient conditions are presented for a square matrix over an arbitrary fiel...
AbstractLet A1, A2 be given n-by-n Hermitian or symmetric matrices, and consider the simultaneous tr...
AbstractLet A1, A2 be given n-by-n Hermitian or symmetric matrices, and consider the simultaneous tr...
This diploma thesis, Takagi factorization, presents the reader a factorization of complex symmetric ...
AbstractNecessary and sufficient conditions are presented for a square matrix over an arbitrary fiel...
AbstractThere are several ways in which a matrix can be factorized as a product of two special matri...
In [C.R. Johnson, B. Kroschel, M. Omladic, Eigenvalue multiplicities in principal submatrices, Linea...
AbstractLet A and B be hermitian matrices with given eigenvalues (a1,…an) and (b1,…bn) respectively....
In [C.R. Johnson, B. Kroschel, M. Omladic, Eigenvalue multiplicities in principal submatrices, Linea...
Introduction: Although the results already have been published (partially) by Frobenius in 1910 (see...
This paper presents elementary proofs of the factorization of a square matrix into two hermitian or ...
This paper presents elementary proofs of the factorization of a square matrix into two hermitian or ...
Introduction: Although the results already have been published (partially) by Frobenius in 1910 (see...
This paper presents elementary proofs of the factorization of a square matrix into two hermitian or ...
This paper presents elementary proofs of the factorization of a square matrix into two hermitian or ...
AbstractNecessary and sufficient conditions are presented for a square matrix over an arbitrary fiel...
AbstractLet A1, A2 be given n-by-n Hermitian or symmetric matrices, and consider the simultaneous tr...
AbstractLet A1, A2 be given n-by-n Hermitian or symmetric matrices, and consider the simultaneous tr...
This diploma thesis, Takagi factorization, presents the reader a factorization of complex symmetric ...
AbstractNecessary and sufficient conditions are presented for a square matrix over an arbitrary fiel...
AbstractThere are several ways in which a matrix can be factorized as a product of two special matri...
In [C.R. Johnson, B. Kroschel, M. Omladic, Eigenvalue multiplicities in principal submatrices, Linea...
AbstractLet A and B be hermitian matrices with given eigenvalues (a1,…an) and (b1,…bn) respectively....
In [C.R. Johnson, B. Kroschel, M. Omladic, Eigenvalue multiplicities in principal submatrices, Linea...