Disturbance observer design for a class of nonlinear system with application to active suspension system control

A systematic disturbance observer for a class of nonlinear affine systems subject to bounded exogenous input is designed. The main idea expounded upon is to design the “control law” for the observer dynamics such that the tracking error between the observer states and the original system states lies within a bounded set. It is then shown that, provided that the system satisfies some sufficient conditions, then the observer control authority will track the unknown exogenous input with the same order of magnitude of the error. In other words, the observer dynamics is designed to recreate the measured behavior of the original system to some order of accuracy. If this happens, then, under certain sufficient conditions, the control authority that reproduced this measured behavior will track the unknown disturbance input to the same order of accuracy. While the concepts developed in this paper can be used for a class of nonlinear system, the main application considered is the active suspension system control. The motivation is to eventually use the observed disturbance as a preview information for a cascaded suspension system.

[1]  Goodarz Ahmadi,et al.  Optimal Active Control of Vehicle Suspension System Including Time Delay and Preview for Rough Roads , 2002 .

[2]  Robin S. Sharp,et al.  Optimization and Performance Enhancement of Active Suspensions for Automobiles under Preview of the Road , 1992 .

[3]  Dean Karnopp,et al.  Active and semi-active vibration isolation , 1995 .

[4]  Masayoshi Tomizuka,et al.  The optimal finite preview problem and its application to man-machine systems. , 1974 .

[5]  T Tanaka,et al.  Ride comfort improvement using preview sensor , 1992 .

[6]  J. Lückel,et al.  DESIGN OF AN ACTIVE SUSPENSION FOR A PASSENGER VEHICLE MODEL USING INPUT PROCESSES WITH TIME DELAYS , 1985 .

[7]  Zhang Yonglin,et al.  Numerical simulation of stochastic road process using white noise filtration , 2006 .

[8]  M. Tomizuka Optimal continuous finite preview problem , 1975 .

[9]  C. Pilbeam,et al.  PERFORMANCE POTENTIAL AND POWER CONSUMPTION OF SLOW-ACTIVE SUSPENSION SYSTEMS WITH PREVIEW. , 1996 .

[10]  M. Nakano,et al.  Optimum Preview Control of Vehicle Air Suspensions , 1976 .

[11]  Aleksander Hac,et al.  Optimal Semi-Active Suspension with Preview based on a Quarter Car Model , 1991, 1991 American Control Conference.

[12]  Javad Marzbanrad,et al.  OPTIMAL PREVIEW CONTROL DESIGN OF AN ACTIVE SUSPENSION BASED ON A FULL CAR MODEL , 2003 .

[13]  B. R. Davis,et al.  An Optimal Linear Active Suspension with Finite Road Preview , 1980 .

[14]  Masayoshi Tomizuka,et al.  “Optimum Linear Preview Control With Application to Vehicle Suspension”—Revisited , 1976 .

[15]  E. K. Bender,et al.  Optimum Linear Preview Control With Application to Vehicle Suspension , 1968 .

[16]  David Crolla,et al.  ACTIVE SUSPENSION CONTROL; PERFORMANCE COMPARISONS USING CONTROL LAWS APPLIED TO A FULL VEHICLE MODEL , 1991 .

[17]  Costas Kravaris,et al.  Nonlinear observer design for state and disturbance estimation , 2004 .

[18]  Aleksander Hac Optimal Linear Preview Control of Active Vehicle Suspension , 1992 .

[19]  Y. C. Soh,et al.  Linear set-membership state estimation with unknown but bounded disturbances , 2012, Int. J. Syst. Sci..

[20]  R S Sharp,et al.  ON CONTROL LAWS FOR VEHICLE SUSPENSIONS ACCOUNTING FOR INPUT CORRELATIONS , 1990 .

[21]  A. Hać,et al.  Optimal Design of Active and Semi-Active Suspensions Including Time Delays and Preview , 1993 .

[22]  T. Shimogo,et al.  Optimal Preview Control of Vehicle Suspension , 1975 .

[23]  Javad Marzbanrad,et al.  Stochastic optimal preview control of a vehicle suspension , 2004 .

[24]  Wen-Hua Chen,et al.  Disturbance observer based control for nonlinear systems , 2004, IEEE/ASME Transactions on Mechatronics.

[25]  Peter J. Gawthrop,et al.  A nonlinear disturbance observer for robotic manipulators , 2000, IEEE Trans. Ind. Electron..