Abstract
The most common way of solving the quadratic eigenvalue problem (QEP) (λ2M + λD + K)x = 0 is to convert it into a linear problem (λX + Y)z = 0 of twice the dimension and solve the linear problem by the QZ algorithm or a Krylov method. In doing so, it is important to understand the influence of the linearization process on the accuracy and stability of the computed solution. We discuss these issues for three particular linearizations: the standard companion linearization and two linearizations that preserve symmetry in the problem. For illustration we employ a model QEP describing the motion of a beam simply supported at both ends and damped at the midpoint. We show that the above linearizations lead to poor numerical results for the beam problem, but that a two-parameter scaling proposed by Fan, Lin and Van Dooren cures the instabilities. We also show that half of the eigenvalues of the beam QEP are pure imaginary and are eigenvalues of the undamped problem. Our analysis makes use of recently developed theory explaining the sensitivity and stability of linearizations, the main conclusions of which are summarized. As well as arguing that scaling should routinely be used, we give guidance on how to choose a linearization and illustrate the practical value of condition numbers and backward errors. Copyright © 2007 John Wiley & Sons, Ltd.
Original language | English |
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Pages (from-to) | 344-360 |
Number of pages | 16 |
Journal | International Journal for Numerical Methods in Engineering |
Volume | 73 |
Issue number | 3 |
DOIs | |
Publication status | Published - 15 Jan 2008 |
Keywords
- Backward error
- Companion form
- Condition number
- Damped beam
- Linearization
- Quadratic eigenvalue problem
- Scaling
- Sensitivity
- Stability