Title :
On the Stability of Positive Linear Switched Systems Under Arbitrary Switching Laws
Author :
Fainshil, Lior ; Margaliot, Michael ; Chigansky, Pavel
Author_Institution :
Sch. of Electr. Eng.-Syst., Tel Aviv Univ., Tel Aviv
fDate :
4/1/2009 12:00:00 AM
Abstract :
We consider n-dimensional positive linear switched systems. A necessary condition for stability under arbitrary switching is that every matrix in the convex hull of the matrices defining the subsystems is Hurwitz. Several researchers conjectured that for positive linear switched systems this condition is also sufficient. Recently, Gurvits, Shorten, and Mason showed that this conjecture is true for the case n = 2, but is not true in general. Their results imply that there exists some minimal integer np such that the conjecture is true for all n < np, but is not true for n = np. We show that np = 3.
Keywords :
linear systems; matrix algebra; stability; time-varying systems; arbitrary switching; convex hull matrix; n-dimensional positive linear switched system; stability condition; Control theory; Linear systems; Stability; Statistics; Sufficient conditions; Switched systems; Switches; Metzler matrix; positive linear systems; stability under arbitrary switching law; switched systems;
Journal_Title :
Automatic Control, IEEE Transactions on
DOI :
10.1109/TAC.2008.2010974
