Upper solution bounds of the continuous and discrete coupled algebraic Riccati equations
Download
Download
Download
Full text for this resource is not available from the Research Repository.
Export
Davies, Richard, Shi, Peng and Wiltshire, Ron (2008) Upper solution bounds of the continuous and discrete coupled algebraic Riccati equations. Automatica, 44 (4). pp. 1088-1096. ISSN 0005-1098
Abstract
In this paper, we propose upper bounds for the sum of the maximal eigenvalues of the solutions of the continuous coupled algebraic Riccati equation (CCARE) and the discrete coupled algebraic Riccati equation (DCARE), which are then used to infer upper bounds for the maximal eigenvalues of the solutions of each Riccati equation. By utilizing the upper bounds for the maximal eigenvalues of each equation, we then derive upper matrix bounds for the solutions of the CCARE and DCARE. Following the development of each bound, an iterative algorithm is proposed which can be used to derive tighter upper matrix bounds. Finally, we give numerical examples to demonstrate the effectiveness of the proposed results, making comparisons with existing results.
Dimensions Badge
Altmetric Badge
| Item type | Article |
| URI | https://vuir.vu.edu.au/id/eprint/4752 |
| DOI | 10.1016/j.automatica.2007.11.001 |
| Official URL | http://dx.doi.org/10.1016/j.automatica.2007.11.001 |
| Subjects | Historical > Faculty/School/Research Centre/Department > Institute for Logistics and Supply Chain Management (ILSCM) Historical > FOR Classification > 0199 Other Mathematical Sciences Information Systems |
| Keywords | ResPubID18758, Coupled Riccati equation, jump linear systems, upper bounds, eigenvalues, JLQ problem, iterative algorithm |
| Citations in Scopus | 27 - View on Scopus |
| Download/View statistics | View download statistics for this item |
CORE (COnnecting REpositories)