Time-limited pseudo-optimal H$_2$-model order reduction
Abstract
A model order reduction algorithm is presented that generates a reduced-order model of the original high-order model, which ensures high-fidelity within the desired time interval. The reduced model satisfies a subset of the first-order optimality conditions for time-limited H-model reduction problem. The algorithm uses a computationally efficient Krylov subspace-based framework to generate the reduced model, and it is applicable to large-scale systems. The reduced-order model is parameterized to enforce a subset of the first-order optimality conditions in an iteration-free way. We also propose an adaptive framework of the algorithm, which ensures a monotonic decay in error irrespective of the choice of interpolation points and tangential directions. The efficacy of the algorithm is validated on benchmark model reduction problems.
Cite
@article{arxiv.1909.10275,
title = {Time-limited pseudo-optimal H$_2$-model order reduction},
author = {Umair Zulfiqar and Victor Sreeram and Xin Du},
journal= {arXiv preprint arXiv:1909.10275},
year = {2020}
}
Comments
IET Control Theory & Applications (2020)