Bibliografie
Journal Article
Linear matrix inequalities for robust strictly positive real design
: IEEE Transaction on Circuits and Systems vol.49, 7 (2002), p. 1017-1020
: CEZ:AV0Z1075907
: GA102/02/0709, GA ČR, ME 427, GA MŠk
: linear matrix inequalities, polynomial, strictly positive real
(eng): A necessary and sufficient condition is proposed for the existence of a polynomial p(s) such that the rational function p(s)/q(s) is robustly strictly positive real when q(s) is a given Hurwitz polynomial with polytopic uncertainty. It turns out that the whole set of candidates p(s) is a convex subset of the cone of positive semidefinite matrices, resulting in a straightforward strictly positive real design algorithm based on linear matrix inequalities.
: 09I
: BC