Title :
On Nonsingularity Verification of Uncertain Matrices Over a Quadratically Constrained Set
Author_Institution :
Dept. of Autom., Tsinghua Univ., Beijing, China
Abstract :
Nonsingularity of a matrix is investigated in this technical note that depends affinely on several uncertainty matrices whose real and imaginary parts are constrained by some quadratic forms. Based on some equivalent descriptions for these uncertainty matrices, a sufficient condition is derived. This condition is given in a linear matrix inequality form and can in principle be efficiently validated. The obtained result includes some well known results in systems and control theory as a special case, such as the Lyapunov equation based stability criterion for linear time invariant systems, the (D,G)-scaling based upper bound for the mixed structured singular value, a sufficient condition for the stability of spatially interconnected systems, etc. A computationally verifiable condition is also provided that indicates situations under which the aforementioned condition becomes necessary.
Keywords :
Lyapunov methods; interconnected systems; linear matrix inequalities; linear systems; quadratic programming; stability; uncertain systems; Lyapunov equation based stability criterion; computationally verifiable condition; control theory; equivalent descriptions; linear matrix inequality; linear time invariant systems; matrix nonsingularity; mixed structured singular value; nonsingularity verification; quadratic forms; quadratically constrained set; spatially interconnected systems; sufficient condition; uncertain matrices; uncertainty matrices; Equations; Linear matrix inequalities; Robustness; Stability criteria; Uncertainty; Upper bound; Linear matrix inequality (LMI); robustness; spatially interconnected system; stability; structured singular value;
Journal_Title :
Automatic Control, IEEE Transactions on
DOI :
10.1109/TAC.2011.2154450
