AbstractWe obtain some results about the block eigenvalues of block compound matrices and additive block compound matrices. Assuming that a certain block Vandermonde matrix is nonsingular, we generalize known results for (scalar) compound and additive compound matrices
AbstractWe study to which extent well-known facts concerning Vandermonde factorization or canonical ...
AbstractIf N is normal and invertible, the matrices A with N∗AN = ϱA for various ϱ span all matrices...
AbstractConsider a n×n matrix partitioned into k×k blocks: C=[Ci,j], where C1,1,…,Ck,k are square. T...
AbstractWe obtain some results about the block eigenvalues of block compound matrices and additive b...
The purpose of this orticle is to present a result about eigenvalues of nonsingular matrices and to ...
AbstractThis paper deals with block diagonalization of partitioned (not necessarily square) matrices...
Block tridiagonal matrices arise in applied mathematics, physics, and signal processing. Many applic...
Johnson CR, Schreiner EA, Elsner L. Eigenvalue neutrality in block triangular matrices. Linear and m...
The Vandermonde matrix is ubiquitous in mathematics and engineering. Both the Vandermonde matrix and...
Abstract. The block analogues of the theorems on inclusion regions for the eigenvalues of normal mat...
SIGLEAvailable from British Library Document Supply Centre- DSC:9091.9(AEA-DR--0416) / BLDSC - Briti...
Abstract. The eigenvectors and eigenvalues of symmetric block circulant ma-trices had been found, an...
AbstractA previous paper by D. Hershkowitz [Linear and Multilinear Algebra 14 (1983) 315–342] descri...
Permanental compound matrices are investigated, compared with classical compound matrices, and used ...
We derive new perturbation bounds for eigenvalues of Hermitian matrices with block structur...
AbstractWe study to which extent well-known facts concerning Vandermonde factorization or canonical ...
AbstractIf N is normal and invertible, the matrices A with N∗AN = ϱA for various ϱ span all matrices...
AbstractConsider a n×n matrix partitioned into k×k blocks: C=[Ci,j], where C1,1,…,Ck,k are square. T...
AbstractWe obtain some results about the block eigenvalues of block compound matrices and additive b...
The purpose of this orticle is to present a result about eigenvalues of nonsingular matrices and to ...
AbstractThis paper deals with block diagonalization of partitioned (not necessarily square) matrices...
Block tridiagonal matrices arise in applied mathematics, physics, and signal processing. Many applic...
Johnson CR, Schreiner EA, Elsner L. Eigenvalue neutrality in block triangular matrices. Linear and m...
The Vandermonde matrix is ubiquitous in mathematics and engineering. Both the Vandermonde matrix and...
Abstract. The block analogues of the theorems on inclusion regions for the eigenvalues of normal mat...
SIGLEAvailable from British Library Document Supply Centre- DSC:9091.9(AEA-DR--0416) / BLDSC - Briti...
Abstract. The eigenvectors and eigenvalues of symmetric block circulant ma-trices had been found, an...
AbstractA previous paper by D. Hershkowitz [Linear and Multilinear Algebra 14 (1983) 315–342] descri...
Permanental compound matrices are investigated, compared with classical compound matrices, and used ...
We derive new perturbation bounds for eigenvalues of Hermitian matrices with block structur...
AbstractWe study to which extent well-known facts concerning Vandermonde factorization or canonical ...
AbstractIf N is normal and invertible, the matrices A with N∗AN = ϱA for various ϱ span all matrices...
AbstractConsider a n×n matrix partitioned into k×k blocks: C=[Ci,j], where C1,1,…,Ck,k are square. T...
DOI
Add to ORKG