AbstractThe known results on almost diagonal Hermitian matrices are generalized to deal with pairs of almost diagonal Hermitian matrices. The pairs are assumed to be definite or positive definite. The obtained estimates are used to justify the failure of the quadratic convergence of Jacobi methods for the generalized eigenvalue problem Ax = λBx
The generalized eigenvalue problem $Ax = \lambda Bx$ has special properties when $(A,B)$ is a Hermit...
AbstractIn this note, we study some basic properties of generalized eigenvalues of a definite Hermit...
AbstractLet B be a given positive definite Hermitian matrix, and assume the matrix P satisfies the “...
AbstractThe known results on almost diagonal Hermitian matrices are generalized to deal with pairs o...
AbstractIn this note, we study some basic properties of generalized eigenvalues of a definite Hermit...
AbstractThis article presents a new Jacobi-like eigenvalue algorithm for non-Hermitian almost diagon...
AbstractLet A be skew-symmetric, B be symmetric positive definite, and the pair (A, B) have multiple...
AbstractLet A and B be Hermitian matrices, and let c(A, B) = inf{|xH(A + iB)x|:‖ = 1}. The eigenvalu...
AbstractThis article presents a new Jacobi-like eigenvalue algorithm for non-Hermitian almost diagon...
AbstractGiven Hermitian matrices A and B, Professor Taussky-Todd posed the problem of estimating the...
AbstractThis paper discusses a generalization for non-Hermitian matrices of the Jacobi eigenvalue pr...
AbstractLet A and B be n-by-n Hermitian matrices over the complex field. A result of Au-Yeung [1] an...
We discuss structure-preserving Jacobi-like algorithms for the solution of the indefinite generalize...
AbstractVeselić and Slapničar gave a general perturbation result for the eigenvalues of the Hermitia...
AbstractThe paper describes a way how one-sided Jacobi-type algorithm of Veselić for computing the h...
The generalized eigenvalue problem $Ax = \lambda Bx$ has special properties when $(A,B)$ is a Hermit...
AbstractIn this note, we study some basic properties of generalized eigenvalues of a definite Hermit...
AbstractLet B be a given positive definite Hermitian matrix, and assume the matrix P satisfies the “...
AbstractThe known results on almost diagonal Hermitian matrices are generalized to deal with pairs o...
AbstractIn this note, we study some basic properties of generalized eigenvalues of a definite Hermit...
AbstractThis article presents a new Jacobi-like eigenvalue algorithm for non-Hermitian almost diagon...
AbstractLet A be skew-symmetric, B be symmetric positive definite, and the pair (A, B) have multiple...
AbstractLet A and B be Hermitian matrices, and let c(A, B) = inf{|xH(A + iB)x|:‖ = 1}. The eigenvalu...
AbstractThis article presents a new Jacobi-like eigenvalue algorithm for non-Hermitian almost diagon...
AbstractGiven Hermitian matrices A and B, Professor Taussky-Todd posed the problem of estimating the...
AbstractThis paper discusses a generalization for non-Hermitian matrices of the Jacobi eigenvalue pr...
AbstractLet A and B be n-by-n Hermitian matrices over the complex field. A result of Au-Yeung [1] an...
We discuss structure-preserving Jacobi-like algorithms for the solution of the indefinite generalize...
AbstractVeselić and Slapničar gave a general perturbation result for the eigenvalues of the Hermitia...
AbstractThe paper describes a way how one-sided Jacobi-type algorithm of Veselić for computing the h...
The generalized eigenvalue problem $Ax = \lambda Bx$ has special properties when $(A,B)$ is a Hermit...
AbstractIn this note, we study some basic properties of generalized eigenvalues of a definite Hermit...
AbstractLet B be a given positive definite Hermitian matrix, and assume the matrix P satisfies the “...
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