Volume 26, pp. 1-33, 2007.
A structured staircase algorithm for skew-symmetric/symmetric pencils
Ralph Byers, Volker Mehrmann, and Hongguo Xu
Abstract
We present structure preserving algorithms for the numerical computation of structured staircase forms of skew-symmetric/symmetric matrix pencils along with the Kronecker indices of the associated skew-symmetric/symmetric Kronecker-like canonical form. These methods allow deflation of the singular structure and deflation of infinite eigenvalues with index greater than one. Two algorithms are proposed: one for general skew-symmetric/symmetric pencils and one for pencils in which the skew-symmetric matrix is a direct sum of $0$ and $\mathcal{J}=\left[\begin{array}{cc}0 & I \\ -I & 0 \end{array}\right]$. We show how to use the structured staircase form to solve boundary value problems arising in control applications and present numerical examples.
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Key words
structured staircase form, linear-quadratic control, $H_\infty$ control, structured Kronecker canonical form, skew-symmetric/symmetric pencil, skew-Hamiltonian/Hamiltonian pencil
AMS subject classifications
65F15, 15A21, 93B40
Links to the cited ETNA articles
[35] | Vol. 13 (2002), pp. 106-118 Volker Mehrmann and David Watkins: Polynomial eigenvalue problems with Hamiltonian structure |
ETNA articles which cite this article
Vol. 44 (2015), pp. 1-24 Volker Mehrmann and Hongguo Xu: Structure preserving deflation of infinite eigenvalues in structured pencils |
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