A gap metric perspective of well-posedness for nonlinear feedback interconnections

A differential geometric approach based on the gap metric is taken to examine the uniqueness of solutions of the equations describing a feedback interconnection. It is shown that under sufficiently small perturbations on the Fréchet derivative of a nonlinear plant as measured by the gap metric, the uniqueness property is preserved if solutions exist given exogenous signals. The results developed relate the uniqueness of solutions for a nominal feedback interconnection and that involving the derivative of the plant. Causality of closed-loop operators is also investigated. It is established that if a certain open-loop mapping has an inverse over signals with arbitrary start time (i.e. zero before some initial time), then the closed-loop operator is causal provided the latter is weakly additive.

[1]  T. Georgiou,et al.  Robustness analysis of nonlinear feedback systems: an input-output approach , 1997, IEEE Trans. Autom. Control..

[2]  Mark French,et al.  A Biased Approach to Nonlinear Robust Stability and Performance with Applications to Adaptive Control , 2012, SIAM J. Control. Optim..

[3]  C. Desoer,et al.  Feedback Systems: Input-Output Properties , 1975 .

[4]  Wilbur N. Dale,et al.  Stabilizability and existence of system representations for discrete-time time-varying systems , 1993 .

[5]  Mark French,et al.  An Intrinsic Behavioural Approach to the Gap Metric , 2005, Proceedings of the 44th IEEE Conference on Decision and Control.

[6]  G. Vinnicombe Uncertainty and Feedback: H-[infinity] loop shaping and the v-gap metric , 2000 .

[7]  Tryphon T. Georgiou,et al.  Robust stability of feedback systems: a geometric approach using the gap metric , 1993 .

[8]  Tryphon T. Georgiou,et al.  The parallel projection operators of a nonlinear feedback system , 1993 .

[9]  Tryphon T. Georgiou,et al.  Intrinsic difficulties in using the doubly-infinite time axis for input-output control theory , 1995, IEEE Trans. Autom. Control..

[10]  R. Saeks,et al.  The analysis of feedback systems , 1972 .

[11]  Eberhard Zeidler,et al.  Applied Functional Analysis: Main Principles and Their Applications , 1995 .

[12]  R. B. Vinter SYSTEM THEORY A Hilbert Space Approach , 1984 .

[13]  Glenn Vinnicombe,et al.  A /spl nu/-gap distance for uncertain and nonlinear systems , 1999, Proceedings of the 38th IEEE Conference on Decision and Control (Cat. No.99CH36304).

[14]  G. Vinnicombe,et al.  Gap metrics, representations, and nonlinear robust stability , 2000, Proceedings of the 39th IEEE Conference on Decision and Control (Cat. No.00CH37187).

[15]  T. Georgiou,et al.  Optimal robustness in the gap metric , 1989, Proceedings of the 28th IEEE Conference on Decision and Control,.

[16]  Glenn Vinnicombe,et al.  Linear feedback systems and the graph topology , 2002, IEEE Trans. Autom. Control..

[17]  Ulf T. Jönsson,et al.  Robust Stability Analysis for Feedback Interconnections of Time-Varying Linear Systems , 2013, SIAM J. Control. Optim..