Symmetric Formulation of the S-Procedure, Kalman–Yakubovich–Popov Lemma and Their Exact Losslessness Conditions

In the robust stability analysis of linear time invariant systems, the frequency domain and uncertainty domain of interest play algebraically symmetric roles. This paper presents a new formulation of the S-procedure and the KYP lemma which emphasizes this symmetry. The new formulation provides a novel and unified approach for understanding when the KYP lemma provides an exact LMI test for robust stability. The notions of weak and strong mutual losslessness are introduced to characterize lossless S-procedure and KYP lemma. The new formulation has sufficient flexibility to accommodate some recent extensions of the KYP lemma, including the Generalized KYP lemma, the KYP lemma for nD systems, and the diagonal bounded real lemma for internally positive systems. Using the proposed framework, we also provide a lossless scaled small gain test for internally positive systems which gives an alternative proof that the structured singular value for such systems with arbitrary number of scalar uncertainties can be efficiently computed.

[1]  Tomomichi Hagiwara,et al.  Generalized S-procedure for inequality conditions on one-vector-lossless sets and linear system analysis , 2004, CDC.

[2]  Cishen Zhang,et al.  Generalized Two-Dimensional Kalman–Yakubovich–Popov Lemma for Discrete Roesser Model , 2008, IEEE Transactions on Circuits and Systems I: Regular Papers.

[3]  E. Kaszkurewicz,et al.  Matrix diagonal stability in systems and computation , 1999 .

[4]  Shinji Hara,et al.  Generalized KYP lemma: unified frequency domain inequalities with design applications , 2005, IEEE Transactions on Automatic Control.

[5]  Andrew Packard,et al.  The complex structured singular value , 1993, Autom..

[6]  U. Jonsson Lecture Notes on Integral Quadratic Constraints , 2000 .

[7]  A. Rantzer On the Kalman-Yakubovich-Popov lemma , 1996 .

[8]  S. Hara,et al.  Well-posedness of feedback systems: insights into exact robustness analysis and approximate computations , 1998, IEEE Trans. Autom. Control..

[9]  Takashi Tanaka,et al.  The Bounded Real Lemma for Internally Positive Systems and H-Infinity Structured Static State Feedback , 2011, IEEE Transactions on Automatic Control.

[10]  T. Iwasaki,et al.  Generalized S-procedure and finite frequency KYP lemma , 2000 .

[11]  Christopher King,et al.  An alternative proof of the Barker, Berman, Plemmons (BBP) result on diagonal stability and extensions - Corrected Version , 2009 .

[12]  Jie Chen,et al.  Explicit formulas for stability radii of nonnegative and Metzlerian matrices , 1997, IEEE Trans. Autom. Control..

[13]  J. Willems Dissipative dynamical systems part I: General theory , 1972 .

[14]  A. Rantzer,et al.  System analysis via integral quadratic constraints , 1997, IEEE Trans. Autom. Control..

[15]  TOMOMICHI HAGIWARA,et al.  Generalized S-procedure for inequality conditions on one-vector-lossless sets and linear system analysis , 2004, 2004 43rd IEEE Conference on Decision and Control (CDC) (IEEE Cat. No.04CH37601).

[16]  Geir E. Dullerud,et al.  Distributed control design for spatially interconnected systems , 2003, IEEE Trans. Autom. Control..