Add to ORKGWe investigate the perturbation of the palindromic eigenvalue problem for the matrix quadratic $P(\lambda) \equiv \lambda^2 A_1^T + \lambda A_0 + A_1$, with $A_0,\, A_1 \in \cs^{n \times n}$ and $A_0^T = A_0$. The perturbation of palindromic eigenvalues and eigenvectors, in terms of general matrix polynomials, palindromic linearizations, (semi-Schur) anti-triangular canonical forms and differentiation, are discussed. doi:10.1017/S144618110800031
Palindromic polynomial eigenvalue problems and related classes of structured eigenvalue problems are...
© 2017 Society for Industrial and Applied Mathematics. We contribute to the perturbation theory of n...
AbstractThe standard way to solve polynomial eigenvalue problems P(λ)x=0 is to convert the matrix po...
We investigate the perturbation of the palindromic eigenvalue problem for the matrix quadratic $P(\l...
We investigate the perturbation of the palindromic eigenvalue problem for the matrix quadratic $P(\l...
We investigate the perturbation of the palindromic eigenvalue problem for the matrix quadratic $P(\l...
We investigate the perturbation of the palindromic eigenvalue problem for the matrix quadratic $P(\l...
[[abstract]]We investigate the perturbation of the palindromic eigenvalue problem for the matrix qua...
A structured backward error analysis for an approximate eigenpair of structured nonlinear matrix equ...
A structured backward error analysis for an approximate eigenpair of structured nonlinear matrix equ...
We present structure-preserving numerical methods for the eigenvalue problem of complex palindromic ...
Abstract. We present structure-preserving numerical methods for the eigenvalue problem of complex pa...
Key words: eigenvalue problem, matrix polynomials, palindromic Abstract. A rational eigenvalue probl...
Abstract. Palindromic polynomial eigenvalue problems and related classes of structured eigenvalue pr...
The standard way to solve polynomial eigenvalue problems $P(\la)x=0$ is to convert the matrix polyno...
Palindromic polynomial eigenvalue problems and related classes of structured eigenvalue problems are...
© 2017 Society for Industrial and Applied Mathematics. We contribute to the perturbation theory of n...
AbstractThe standard way to solve polynomial eigenvalue problems P(λ)x=0 is to convert the matrix po...
We investigate the perturbation of the palindromic eigenvalue problem for the matrix quadratic $P(\l...
We investigate the perturbation of the palindromic eigenvalue problem for the matrix quadratic $P(\l...
We investigate the perturbation of the palindromic eigenvalue problem for the matrix quadratic $P(\l...
We investigate the perturbation of the palindromic eigenvalue problem for the matrix quadratic $P(\l...
[[abstract]]We investigate the perturbation of the palindromic eigenvalue problem for the matrix qua...
A structured backward error analysis for an approximate eigenpair of structured nonlinear matrix equ...
A structured backward error analysis for an approximate eigenpair of structured nonlinear matrix equ...
We present structure-preserving numerical methods for the eigenvalue problem of complex palindromic ...
Abstract. We present structure-preserving numerical methods for the eigenvalue problem of complex pa...
Key words: eigenvalue problem, matrix polynomials, palindromic Abstract. A rational eigenvalue probl...
Abstract. Palindromic polynomial eigenvalue problems and related classes of structured eigenvalue pr...
The standard way to solve polynomial eigenvalue problems $P(\la)x=0$ is to convert the matrix polyno...
Palindromic polynomial eigenvalue problems and related classes of structured eigenvalue problems are...
© 2017 Society for Industrial and Applied Mathematics. We contribute to the perturbation theory of n...
AbstractThe standard way to solve polynomial eigenvalue problems P(λ)x=0 is to convert the matrix po...