Approximation of damped quadratic eigenvalue problem by dimension reduction (CROSBI ID 255513)
Prilog u časopisu | izvorni znanstveni rad | međunarodna recenzija
Podaci o odgovornosti
Truhar, Ninoslav ; Tomljanović, Zoran ; Puvača, Matea
engleski
Approximation of damped quadratic eigenvalue problem by dimension reduction
This paper presents an approach to the efficient calculation of all or just one important part of the eigenvalues of the parameter dependent quadratic eigenvalue problem $(\lambda^2(\mathbf{; ; ; ; v}; ; ; ; ) M + \lambda(\mathbf{; ; ; ; v}; ; ; ; ) D(\mathbf{; ; ; ; v}; ; ; ; ) + K) x(\mathbf{; ; ; ; v}; ; ; ; ) = 0$, where $M, K$ are positive definite Hermitian $n\times n$ matrices and $D(\mathbf{; ; ; ; v}; ; ; ; )$ is an $n\times n$ Hermitian semidefinite matrix which depends on a damping parameter vector $\mathbf{; ; ; ; v}; ; ; ; = \begin{; ; ; ; bmatrix}; ; ; ; v_1 & \ldots & v_k \end{; ; ; ; bmatrix}; ; ; ; \in \mathbb{; ; ; ; R}; ; ; ; _+^k$. With the new approach one can efficiently (and accurately enough) calculate all (or just part of the) eigenvalues even for the case when the parameters $v_i$, which in this paper represent damping viscosities, are of the modest magnitude. Moreover, we derive two types of approximations with corresponding error bounds. The quality of error bounds as well as the performance of the achieved eigenvalue tracking are illustrated in several numerical experiments.
Dimension reduction ; Parameter dependent eigenvalue problem ; Tracking eigenvalues ; Eigenvalue error bounds
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Podaci o izdanju
374
2019.
40-53
objavljeno
0096-3003
1873-5649
10.1016/j.amc.2018.10.047