Title :
A new vertex result for robustness problems with interval matrix uncertainty
Author :
Alamo, T. ; Tempo, R. ; Ramirez, D.R. ; Camacho, E.F.
Author_Institution :
Dept. de Ing. de Sist. y Autom., Univ. de Sevilla, Sevilla, Spain
Abstract :
This paper addresses a family of robustness problems in which the system under consideration is affected by interval matrix uncertainty. The main contribution of the paper is a new vertex result that drastically reduces the number of extreme realizations required to check robust feasibility. This vertex result allows one to solve, in a deterministic way and without introducing conservatism, the corresponding robustness problem for small and medium size problems. For example, consider quadratic stability of an autonomous nx dimensional system. In this case, instead of checking equation vertices, we show that it suffices to check 22nx specially constructed systems. This solution is still exponential, but this is not surprising because the problem is NP-hard. Finally, vertex extensions to multiaffine interval families and some sufficient conditions (in LMI form) for robust feasibility are presented. Some illustrative examples are also given.
Keywords :
computational complexity; linear matrix inequalities; linear systems; optimisation; robust control; LMI form; NP-hard problem; interval matrix uncertainty; multiaffine interval families; quadratic stability; robust linear control; robustness problems; sufficient conditions; vertex extensions; Equations; Linear matrix inequalities; Robustness; Stability analysis; Symmetric matrices; Uncertainty; Vectors; Interval matrices; Linear matrix inequalities; Quadratic stability; Robust linear control;
Conference_Titel :
Control Conference (ECC), 2007 European
Conference_Location :
Kos
Print_ISBN :
978-3-9524173-8-6
