Title :
Specialized Eigenvalue Methods for Large-Scale Model Order Reduction Problems
Author :
Rommes, Joost ; Martins, Nelson
Author_Institution :
I&T/DTF High Tech Campus 37, NXP Semicond. Corp., Eindhoven
Abstract :
Physical structures and processes are modeled by dynamical systems in many application areas, such as the design of very large-scale integration chips or large power systems. Since these dynamical systems can become very large, the essential simulation before production may consume hours or days of computing time. Hence there is need for efficient approaches that limit the computing time while preserving the accuracy. In this paper it will be shown how specialized eigen value methods and model order reduction techniques can be used to perform fast and accurate simulations of large dynamical systems. Results will be illustrated by numerical experiments with realistic examples.
Keywords :
eigenvalues and eigenfunctions; large-scale systems; reduced order systems; large dynamical systems; large-scale model order reduction problems; specialized eigenvalue methods; Computational modeling; Eigenvalues and eigenfunctions; Large scale integration; Large-scale systems; Power system dynamics; Power system modeling; Power system simulation; Power system stability; Reduced order systems; Transfer functions; circuit simulation; eigenvalue problems; large-scale dynamical systems; modal analysis; odel order reduction; poles and zeros; power systems; sensitivity analysis; small-signal stability; transfer functions;
Conference_Titel :
Computational Science and Engineering, 2008. CSE '08. 11th IEEE International Conference on
Conference_Location :
Sao Paulo
Print_ISBN :
978-0-7695-3193-9
DOI :
10.1109/CSE.2008.29
