Title :
Exact Stability Analysis of 2-D Systems Using LMIs
Author :
Ebihara, Yoshio ; Ito, Yoshimichi ; Hagiwara, Tomomichi
Author_Institution :
Dept. of Electr. Eng., Kyoto Univ.
Abstract :
In this note, we propose necessary and sufficient conditions for the asymptotic stability analysis of two-dimensional (2-D) systems in terms linear matrix inequalities (LMIs). By introducing a guardian map for the set of Schur stable complex matrices, we first reduce the stability analysis problems into nonsingularity analysis problems of parameter-dependent complex matrices. Then, by means of the discrete-time positive real lemma and the generalized S-procedure, we derive LMI-based conditions that enable us to analyze the asymptotic stability in an exact (i.e., nonconservative) fashion. It turns out that, by employing the generalized S-procedure, we can derive smaller size of LMIs so that the computational burden can be reduced
Keywords :
asymptotic stability; control system analysis; linear matrix inequalities; multidimensional systems; 2D systems; LMI; Schur stable complex matrices; asymptotic stability analysis; linear matrix inequalities; nonsingularity analysis; parameter dependent complex matrices; Asymptotic stability; Eigenvalues and eigenfunctions; Error correction; Error correction codes; Linear matrix inequalities; Matrices; Notice of Violation; Riccati equations; Stability analysis; Two dimensional displays; Linear matrix inequalities (LMIs); stability analysis; two-dimensional (2-D) systems;
Journal_Title :
Automatic Control, IEEE Transactions on
DOI :
10.1109/TAC.2006.880789
