Title :
Parameter-dependent Lyapunov d-stability bound
Author :
Bachelier, O. ; Arzelier, D. ; Peaucelle, D.
Author_Institution :
LAII, ESIP, Poitiers, France
Abstract :
The problem of robust matrix root-clustering against additive structured uncertainty is addressed. A bound on the size of the uncertainty domain preserving matrix D-stability is derived from an LMI approach. A recently proposed sufficient condition for robust matrix D-stability with respect to convex polytopic uncertainty is used. It is relevant to the framework dealing with parameter-dependent Lyapunov functions.
Keywords :
linear matrix inequalities; robust control; uncertain systems; LMI approach; additive structured uncertainty; convex polytopic uncertainty; parameter-dependent Lyapunov D-stability bound; robust matrix D-stability; robust matrix root-clustering; sufficient condition; uncertainty domain preserving matrix D-stability; Eigenvalues and eigenfunctions; Linear matrix inequalities; Robustness; Symmetric matrices; Uncertainty; LMI; Robustness bound; generalized eigenvalue problem;
Conference_Titel :
Control Conference (ECC), 2001 European
Conference_Location :
Porto
Print_ISBN :
978-3-9524173-6-2
