Analysis and Synthesis of Reset Control Systems

This survey monograph overviews a large core of research results produced by the authors in the past decade about reset controllers for linear and nonlinear plants. The corresponding feedback laws generalize classical dynamic controllers because of the interplay of mixed continuous/discrete dynamics. The obtained closed-loop system falls then within the category of hybrid dynamical systems, with the specific feature that the hybrid nature arises from the nature of the controller, rather than the nature of the plant, which is purely continuous-time. Due to this fact, the presented results focus on performance and stability notions that prioritize continuous-time evolution as compared to the discrete-time one. Dwell-time logics (namely, conditions preventing consecutive jumps that are too close to each other) are indeed enforced on solutions, to ensure that the continuous evolution of solutions is complete (no Zeno solutions occur). After presenting a historical motivation and an overview of the results on this topic in Part I, several results on stability and performance analysis and on control design for general linear continuous-time plants are developed in Part II. These results are developed by exploiting the well-established formalism for nonlinear hybrid dynamical systems introduced by Andy Teel and co-authors around 2004. With this formalism, by ensuring sufficient regularity of the reset controller dynamics, we ensure robustness of stability with respect to small disturbances and uncertainties together with suitable continuity of solutions, generally regarded as well-posedness of the hybrid closed loop. Throughout Part II, we provide several simulation studies showing that reset control strategies may allow to attain better performance with respect to the optimal ones obtained by classical continuous-time controllers. Finally, in Part III we focus on planar systems, that is reset closed loops involving a one-dimensional linear plant and a one-dimensional reset controller. For this simple interconnection interesting stability conditions can be drawn and relevant extensions addressing the reference tracking problem are introduced, illustrating them on a few relevant case studies emerging in the automotive field.

[1]  Chen Peng,et al.  Event-triggered communication and H∞H∞ control co-design for networked control systems , 2013, Autom..

[2]  J. Daafouz,et al.  Stabilization of linear impulsive systems through a nearly-periodic reset , 2013 .

[3]  Andrew R Teel,et al.  Observer-based hybrid feedback: a local separation principle , 2010, Proceedings of the 2010 American Control Conference.

[4]  Sophie Tarbouriech,et al.  Guaranteed stability for nonlinear systems by means of a hybrid loop , 2010 .

[5]  K. C. Wong,et al.  Plant With Integrator: An Example of Reset Control Overcoming Limitations of Linear Feedback , 2001 .

[6]  Christopher V. Hollot,et al.  Stability and asymptotic performance analysis of a class of reset control systems , 2000, Proceedings of the 39th IEEE Conference on Decision and Control (Cat. No.00CH37187).

[7]  Alfonso Baños,et al.  Reset control systems with reset band: Well-posedness, limit cycles and stability analysis , 2014, Syst. Control. Lett..

[8]  Nicolas Marchand,et al.  Stability of non-linear systems by means of event-triggered sampling algorithms , 2014, IMA J. Math. Control. Inf..

[9]  Sophie Tarbouriech,et al.  Using Luenberger observers and dwell‐time logic for feedback hybrid loops in continuous‐time control systems , 2013 .

[10]  Youyi Wang,et al.  Reset Integral-Derivative Control for HDD Servo Systems , 2007, IEEE Transactions on Control Systems Technology.

[11]  Sophie Tarbouriech,et al.  Event-triggered control via reset control systems framework , 2016 .

[12]  M. L. Chambers The Mathematical Theory of Optimal Processes , 1965 .

[13]  Lennart Ljung,et al.  System identification toolbox for use with MATLAB , 1988 .

[14]  M Maarten Steinbuch,et al.  Experimental demonstration of reset control design , 2000 .

[15]  Alfonso Baños,et al.  Network-Based Reset Control Systems With Time-Varying Delays , 2014, IEEE Transactions on Industrial Informatics.

[16]  Luca Zaccarian,et al.  Stability properties of reset systems , 2008, Autom..

[17]  Lihua Xie,et al.  Stability analysis and design of reset control systems with discrete-time triggering conditions , 2012, Autom..

[18]  Youyi Wang,et al.  Improved Reset Control Design for a PZT Positioning Stage , 2007, 2007 IEEE International Conference on Control Applications.

[19]  Aneel Tanwani,et al.  Observer-based feedback stabilization of linear systems with event-triggered sampling and dynamic quantization , 2016, Syst. Control. Lett..

[20]  Alfonso Baños,et al.  Optimal reset adaptive observer design , 2011, Syst. Control. Lett..

[21]  Wassim M. Haddad,et al.  Non-linear impulsive dynamical systems. Part II: Stability of feedback interconnections and optimality , 2001 .

[22]  Franco Blanchini,et al.  Stabilizability of switched linear systems does not imply the existence of convex Lyapunov functions , 2006, CDC.

[23]  W. P. M. H. Heemels,et al.  H2 performance analysis of reset control systems , 2007, 2007 46th IEEE Conference on Decision and Control.

[24]  Ricardo G. Sanfelice,et al.  State estimation of linear systems in the presence of sporadic measurements , 2016, Autom..

[25]  Orhan Beker,et al.  Stability of a reset control system under constant inputs , 1999, Proceedings of the 1999 American Control Conference (Cat. No. 99CH36251).

[26]  D. Luenberger Observers for multivariable systems , 1966 .

[27]  Luca Zaccarian,et al.  Stability and Performance of SISO Control Systems With First-Order Reset Elements , 2011, IEEE Transactions on Automatic Control.

[28]  Wassim M. Haddad,et al.  Active control of combustion instabilities via hybrid resetting controllers , 2000, Proceedings of the 2000 American Control Conference. ACC (IEEE Cat. No.00CH36334).

[29]  Luca Zaccarian,et al.  On Finite Gain Lp Stability for Hybrid Systems , 2012, ADHS.

[30]  Sophie Tarbouriech,et al.  LMI-based reset H∞ analysis and design for linear continuous-time plants , 2016 .

[31]  M Maarten Steinbuch,et al.  Performance analysis of reset control systems , 2010 .

[32]  L. Zaccarian,et al.  On necessary and sufficient conditions for exponential and L2 stability of planar reset systems , 2008, 2008 American Control Conference.

[33]  R. Sanfelice,et al.  Hybrid dynamical systems , 2009, IEEE Control Systems.

[34]  Ricardo G. Sanfelice,et al.  Hybrid Dynamical Systems: Modeling, Stability, and Robustness , 2012 .

[35]  P. Kokotovic,et al.  Inverse Optimality in Robust Stabilization , 1996 .

[36]  Dennis S. Bernstein,et al.  Resetting Virtual Absorbers for Vibration Control , 2000 .

[37]  Alfonso Baños,et al.  Reset Control of an Industrial In-Line pH Process , 2009, IEEE Transactions on Control Systems Technology.

[38]  Yuandan Lin,et al.  A universal formula for stabilization with bounded controls , 1991 .

[39]  Chaohong Cai,et al.  Characterizations of input-to-state stability for hybrid systems , 2009, Syst. Control. Lett..

[40]  Gonzalo López-Nicolás,et al.  Reset Adaptive Observer for a Class of Nonlinear Systems , 2012, IEEE Transactions on Automatic Control.

[41]  A.R. Teel,et al.  Homogeneous hybrid systems and a converse Lyapunov theorem , 2006, Proceedings of the 45th IEEE Conference on Decision and Control.

[42]  Luca Zaccarian,et al.  Analytical and numerical Lyapunov functions for SISO linear control systems with first‐order reset elements , 2011 .

[43]  Rafal Goebel,et al.  Preasymptotic Stability and Homogeneous Approximations of Hybrid Dynamical Systems , 2010, SIAM Rev..

[44]  C. Scherer,et al.  Multiobjective output-feedback control via LMI optimization , 1997, IEEE Trans. Autom. Control..

[45]  Sophie Tarbouriech,et al.  On hybrid state-feedback loops based on a dwell-time logic , 2012, ADHS.

[46]  Luca Zaccarian,et al.  Event-triggered transmission for linear control over communication channels , 2013, Autom..

[47]  Paulo Tabuada,et al.  Event-triggered and self-triggered stabilization of distributed networked control systems , 2011, IEEE Conference on Decision and Control and European Control Conference.

[48]  Rafal Goebel,et al.  Solutions to hybrid inclusions via set and graphical convergence with stability theory applications , 2006, Autom..

[49]  Orhan Beker,et al.  On establishing classic performance measures for reset control systems , 2001 .

[50]  Alfonso Baños,et al.  Reset compensation for temperature control: experimental application on heat exchangers , 2010 .

[51]  Daniel Liberzon,et al.  Switching in Systems and Control , 2003, Systems & Control: Foundations & Applications.

[52]  W. P. M. H. Heemels,et al.  $\mathcal{L}_{2}$-Gain Analysis for a Class of Hybrid Systems With Applications to Reset and Event-Triggered Control: A Lifting Approach , 2016, IEEE Transactions on Automatic Control.

[53]  A. Banos,et al.  Reset control for passive teleoperation , 2008, 2008 34th Annual Conference of IEEE Industrial Electronics.

[54]  Sophie Tarbouriech,et al.  Quadratic Stability for Hybrid Systems With Nested Saturations , 2012, IEEE Transactions on Automatic Control.

[55]  Sophie Tarbouriech,et al.  Stability analysis of linear impulsive delay dynamical systems via looped-functionals , 2017, Autom..

[56]  Chengzhi Yuan,et al.  Output feedback reset control of general MIMO LTI systems , 2014, 2014 European Control Conference (ECC).

[57]  Paulo Tabuada,et al.  Event-Triggered Real-Time Scheduling of Stabilizing Control Tasks , 2007, IEEE Transactions on Automatic Control.

[58]  Sophie Tarbouriech,et al.  Improving the performance of linear systems by adding a hybrid loop: The output feedback case , 2012, ACC.

[59]  Sophie Tarbouriech,et al.  A convex hybrid H∞ synthesis with guaranteed convergence rate , 2012, 2012 IEEE 51st IEEE Conference on Decision and Control (CDC).

[60]  Luca Zaccarian,et al.  Reset passivation of nonlinear controllers via a suitable time-regular reset map , 2011, Autom..

[61]  W. P. M. H. Heemels,et al.  An LMI-based L2 gain performance analysis for reset control systems , 2008, 2008 American Control Conference.

[62]  E. Yaz Linear Matrix Inequalities In System And Control Theory , 1998, Proceedings of the IEEE.

[63]  Andrew R. Teel,et al.  Uniting Local and Global Output Feedback Controllers , 2011, IEEE Transactions on Automatic Control.

[64]  Christophe Prieur,et al.  Semi-global stabilization by an output feedback law from a hybrid state controller , 2016, Autom..

[65]  Alireza Khayatian,et al.  Reset law design based on robust model predictive strategy for uncertain systems , 2014 .

[66]  Alfonso Baños,et al.  Reset Control for Passive Bilateral Teleoperation , 2011, IEEE Transactions on Industrial Electronics.

[67]  Youyi Wang,et al.  Stability analysis and design of reset systems: Theory and an application , 2009, Autom..

[68]  Izumi Masubuchi,et al.  LMI-based controller synthesis: A unified formulation and solution , 1998 .

[69]  Sophie Tarbouriech,et al.  Stability analysis for reset systems with input saturation , 2007, 2007 46th IEEE Conference on Decision and Control.

[70]  Sophie Tarbouriech,et al.  Exponential Stability for Hybrid Systems with Saturations , 2013 .

[71]  Christopher V. Hollot,et al.  On Horowitz's contributions to reset control , 2002 .

[72]  Ricardo G. Sanfelice,et al.  A toolbox for simulation of hybrid systems in matlab/simulink: hybrid equations (HyEQ) toolbox , 2013, HSCC '13.

[73]  P. Gahinet,et al.  H design with pole placement constraints , 2018 .

[74]  A. Satoh State Feedback Synthesis of Linear Reset Control with L2 Performance Bound via LMI Approach , 2011 .

[75]  J. Hespanha,et al.  Hybrid systems: Generalized solutions and robust stability , 2004 .

[76]  Asgeir J. Sørensen,et al.  Lyapunov-Based Integrator Resetting With Application to Marine Thruster Control , 2008, IEEE Transactions on Control Systems Technology.

[77]  L. Zaccarian,et al.  First order reset elements and the Clegg integrator revisited , 2005, Proceedings of the 2005, American Control Conference, 2005..

[78]  Arjan van der Schaft,et al.  A passivity-based approach to reset control systems stability , 2010, Syst. Control. Lett..

[79]  Luca Zaccarian,et al.  Lyapunov-Based Sufficient Conditions for Exponential Stability in Hybrid Systems , 2013, IEEE Transactions on Automatic Control.

[80]  Y. Chait,et al.  Stability analysis for control systems with reset integrators , 1997, Proceedings of the 36th IEEE Conference on Decision and Control.

[81]  Jingcheng Wang,et al.  Reset observers for linear time-varying delay systems: Delay-dependent approach , 2014, J. Frankl. Inst..

[82]  Changchun Hua,et al.  Improved High-Order-Reset-Element Model Based on Circuit Analysis , 2017, IEEE Transactions on Circuits and Systems II: Express Briefs.

[83]  A. Astolfi,et al.  Robust stabilization of chained systems via hybrid control , 2002, Proceedings of the 41st IEEE Conference on Decision and Control, 2002..

[84]  Luca Zaccarian,et al.  An adaptive reset control scheme for valve current tracking in a power-split transmission system , 2015, 2015 European Control Conference (ECC).

[85]  Sophie Tarbouriech,et al.  A hybrid scheme for reducing peaking in high-gain observers for a class of nonlinear systems , 2016, Autom..

[86]  Sophie Tarbouriech,et al.  Lyapunov-based hybrid loops for stability and performance of continuous-time control systems , 2013, Autom..

[87]  Sophie Tarbouriech,et al.  Stabilization of continuous-time linear systems subject to input quantization , 2015, Autom..

[88]  Gene F. Franklin,et al.  Feedback Control of Dynamic Systems , 1986 .

[89]  Sophie Tarbouriech,et al.  Static anti-windup scheme for a class of homogeneous dwell-time hybrid controllers , 2013, 2013 European Control Conference (ECC).

[90]  S. Sastry,et al.  Simulation of Zeno hybrid automata , 1999, Proceedings of the 38th IEEE Conference on Decision and Control (Cat. No.99CH36304).

[91]  Orhan Beker,et al.  Stability of limit-cycles in reset control systems , 2001, Proceedings of the 2001 American Control Conference. (Cat. No.01CH37148).

[92]  Luca Zaccarian,et al.  Lazy sensors for the scheduling of measurement samples transmission in linear closed loops over networks , 2010, 49th IEEE Conference on Decision and Control (CDC).

[93]  I. Horowitz,et al.  Non-linear design for cost of feedback reduction in systems with large parameter uncertainty † , 1975 .

[94]  C. Hollot,et al.  FUNDAMENTAL PROPERTIES OF RESET CONTROL SYSTEMS , 2002 .

[95]  Francesco Fichera,et al.  Lyapunov techniques for a class of hybrid systems and reset controller syntheses for continuous-time plants , 2013 .

[96]  Sophie Tarbouriech,et al.  Delay-Independent Stability Via Reset Loops , 2014 .

[97]  Ricardo G. Sanfelice,et al.  Invariance Principles for Hybrid Systems With Connections to Detectability and Asymptotic Stability , 2007, IEEE Transactions on Automatic Control.

[98]  Orhan Beker,et al.  Stability of a MIMO reset control system under constant inputs , 1999, Proceedings of the 38th IEEE Conference on Decision and Control (Cat. No.99CH36304).

[99]  Dragan Nesic,et al.  Robust event-triggered output feedback controllers for nonlinear systems , 2017, Autom..

[100]  A. Isidori Nonlinear Control Systems , 1985 .

[101]  Paulo Tabuada,et al.  To Sample or not to Sample: Self-Triggered Control for Nonlinear Systems , 2008, IEEE Transactions on Automatic Control.

[102]  Alfonso Baños,et al.  Delay-dependent stability of reset systems , 2010, Autom..

[103]  F. Clarke Optimization And Nonsmooth Analysis , 1983 .

[104]  Orhan Beker,et al.  On reset control systems with second-order plants , 2000, Proceedings of the 2000 American Control Conference. ACC (IEEE Cat. No.00CH36334).

[105]  Andrew R. Teel,et al.  On using norm estimators for event-triggered control with dynamic output feedback , 2015, 2015 54th IEEE Conference on Decision and Control (CDC).

[106]  Christopher V. Hollot,et al.  Analysis of reset control systems consisting of a FORE and second-order loop , 2001 .

[107]  Johan Löfberg,et al.  YALMIP : a toolbox for modeling and optimization in MATLAB , 2004 .

[108]  W. P. M. H. Heemels,et al.  Periodic Event-Triggered Control for Linear Systems , 2013, IEEE Trans. Autom. Control..

[109]  Y. Chait,et al.  On the zero-input stability of control systems with Clegg integrators , 1997, Proceedings of the 1997 American Control Conference (Cat. No.97CH36041).

[110]  Sophie Tarbouriech,et al.  LMI-Based Reset ${\mathcal H}_{\infty}$ Design for Linear Continuous-Time Plants , 2016, IEEE Transactions on Automatic Control.

[111]  Chaohong Cai,et al.  Smooth Lyapunov Functions for Hybrid Systems Part II: (Pre)Asymptotically Stable Compact Sets , 2008, IEEE Transactions on Automatic Control.

[112]  Alfonso Baños,et al.  Delay-Independent Stability of Reset Systems , 2009, IEEE Transactions on Automatic Control.

[113]  Z. Artstein Stabilization with relaxed controls , 1983 .

[114]  Sophie Tarbouriech,et al.  Stability of reset control systems with nonzero reference , 2008, 2008 47th IEEE Conference on Decision and Control.

[115]  Ying Li,et al.  Reset Control for Midfrequency Narrowband Disturbance Rejection With an Application in Hard Disk Drives , 2011, IEEE Transactions on Control Systems Technology.

[116]  J. C. Clegg A nonlinear integrator for servomechanisms , 1958, Transactions of the American Institute of Electrical Engineers, Part II: Applications and Industry.

[117]  L. Zaccarian,et al.  Explicit Lyapunov functions for stability and performance characterizations of FOREs connected to an integrator , 2006, Proceedings of the 45th IEEE Conference on Decision and Control.

[118]  L. Zaccarian,et al.  Set-point stabilization of SISO linear systems using First Order Reset Elements , 2007, 2007 American Control Conference.

[119]  Sophie Tarbouriech,et al.  Anti-windup strategy for reset control systems , 2011 .

[120]  Luca Zaccarian,et al.  Position Regulation of an EGR Valve Using Reset Control With Adaptive Feedforward , 2014, IEEE Transactions on Control Systems Technology.

[121]  Michael Athans,et al.  Design of feedback control systems for stable plants with saturating actuators , 1988, Proceedings of the 27th IEEE Conference on Decision and Control.

[122]  Youyi Wang,et al.  Discrete-Time Optimal Reset Control for Hard Disk Drive Servo Systems , 2009, IEEE Transactions on Magnetics.

[123]  Laurentiu Hetel,et al.  Nonlinear impulsive systems: 2D stability analysis approach , 2017, Autom..

[124]  A. Tornambe,et al.  Experimental results in state estimation of industrial robots , 1990, 29th IEEE Conference on Decision and Control.

[125]  Nathan van de Wouw,et al.  Frequency-domain tools for stability analysis of reset control systems , 2017, Autom..

[126]  Graham C. Goodwin,et al.  Potential benefits of hybrid control for linear time invariant plants , 1997, Proceedings of the 1997 American Control Conference (Cat. No.97CH36041).

[127]  Isaac Horowitz,et al.  Synthesis of a non-linear feedback system with significant plant-ignorance for prescribed system tolerances† , 1974 .

[128]  Miroslav Krstic,et al.  Nonlinear and adaptive control de-sign , 1995 .

[129]  Rafal Goebel,et al.  Hybrid Feedback Control and Robust Stabilization of Nonlinear Systems , 2007, IEEE Transactions on Automatic Control.