Structured Krylov Subspace Methods for Eigenproblems with Spectral Symmetries

Benner, Peter

12 June 2010

We consider large and sparse eigenproblems where the spectrum exhibits special symmetries. Here we focus on Hamiltonian symmetry, that is, the spectrum is symmetric with respect to the real and imaginary axes. After briefly discussing quadratic eigenproblems with Hamiltonian spectra we review structured Krylov subspace methods to aprroximate parts of the spectrum of Hamiltonian operators. We will discuss the optimization of the free parameters in the resulting symplectic Lanczos process in order to minimize the conditioning of the (non-orthonormal) Lanczos basis. The effects of our findings are demonstrated for several numerical examples.

Hamiltonische Symmetrie

symplektischer Lanczos-Prozess

ddc:510

Eigenwertproblem

Hamilton-Operator

Krylov-Verfahren

Structured Krylov Subspace Methods for Eigenproblems with Spectral Symmetries

Benner, Peter

12 June 2010

We consider large and sparse eigenproblems where the spectrum exhibits special symmetries. Here we focus on Hamiltonian symmetry, that is, the spectrum is symmetric with respect to the real and imaginary axes. After briefly discussing quadratic eigenproblems with Hamiltonian spectra we review structured Krylov subspace methods to aprroximate parts of the spectrum of Hamiltonian operators. We will discuss the optimization of the free parameters in the resulting symplectic Lanczos process in order to minimize the conditioning of the (non-orthonormal) Lanczos basis. The effects of our findings are demonstrated for several numerical examples.

info:eu-repo/classification/ddc/510

ddc:510

Eigenwertproblem

Hamilton-Operator

Krylov-Verfahren

Hamiltonische Symmetrie

symplektischer Lanczos-Prozess