AbstractA fast method for computing all the eigenvalues of a Hamiltonian matrix M is given. The method relies on orthogonal symplectic similarity transformations which preserve structure and have desirable numerical properties. The algorithm requires about one-fourth the number of floating-point operations and one-half the space of the standard QR algorithm. The computed eigenvalues are shown to be the exact eigenvalues of a matrix M + E where ∥E∥ depends on the square root of the machine precision. The accuracy of a computed eigenvalue depends on both its condition and its magnitude, larger eigenvalues typically being more accurate
We present a new condensed form for a 2n × 2n symplectic matrix which can be computed by a...
Many fields make use of the concepts about eigenvalues in their studies. In engineering, physics, st...
Given a Hamiltonian matrix H = JS with S symmetric and positive definite, we analyze a symplectic La...
AbstractA fast method for computing all the eigenvalues of a Hamiltonian matrix M is given. The meth...
SIGLELD:6184.6725(71) / BLDSC - British Library Document Supply CentreGBUnited Kingdo
This article describes Fortran 77 subroutines for computing eigenvalues and invariant subspaces of H...
A new method is presented for the numerical computation of the generalized eigen- values of real Ham...
Balancing a matrix by a simple and accurate similarity transformation can improve the speed and accu...
AbstractCharacterizations are given for the Hamiltonian matrices that can be reduced to Hamiltonian ...
AbstractWe develop Jacobi algorithms for solving the complete eigenproblem for Hamiltonian and skew-...
AbstractBalancing a matrix by a simple and accurate similarity transformation can improve the speed ...
AbstractThis paper presents an algorithm for computing the eigenvalues of a symplectic pencil that a...
AbstractA Schur-type decomposition for Hamiltonian matrices is given that relies on unitary symplect...
[[abstract]]We present a fast method for computing the closed-loop eigenvalues of a discrete-time al...
In this thesis we develop and implement a new algorithm for finding the solutions of linear Hamilton...
We present a new condensed form for a 2n × 2n symplectic matrix which can be computed by a...
Many fields make use of the concepts about eigenvalues in their studies. In engineering, physics, st...
Given a Hamiltonian matrix H = JS with S symmetric and positive definite, we analyze a symplectic La...
AbstractA fast method for computing all the eigenvalues of a Hamiltonian matrix M is given. The meth...
SIGLELD:6184.6725(71) / BLDSC - British Library Document Supply CentreGBUnited Kingdo
This article describes Fortran 77 subroutines for computing eigenvalues and invariant subspaces of H...
A new method is presented for the numerical computation of the generalized eigen- values of real Ham...
Balancing a matrix by a simple and accurate similarity transformation can improve the speed and accu...
AbstractCharacterizations are given for the Hamiltonian matrices that can be reduced to Hamiltonian ...
AbstractWe develop Jacobi algorithms for solving the complete eigenproblem for Hamiltonian and skew-...
AbstractBalancing a matrix by a simple and accurate similarity transformation can improve the speed ...
AbstractThis paper presents an algorithm for computing the eigenvalues of a symplectic pencil that a...
AbstractA Schur-type decomposition for Hamiltonian matrices is given that relies on unitary symplect...
[[abstract]]We present a fast method for computing the closed-loop eigenvalues of a discrete-time al...
In this thesis we develop and implement a new algorithm for finding the solutions of linear Hamilton...
We present a new condensed form for a 2n × 2n symplectic matrix which can be computed by a...
Many fields make use of the concepts about eigenvalues in their studies. In engineering, physics, st...
Given a Hamiltonian matrix H = JS with S symmetric and positive definite, we analyze a symplectic La...