This paper tackles the problem of designing state observers for flexible link mechanisms: An investigation is made on the possibility of employing observers making use of suitable piecewise-linear truncated dynamics models. A general and novel approach is proposed, which provides an objective way of synthesizing observers preventing the instability that may arise from using reduced-order linearized models. The approach leads to the identification of the regions of the domain of the state variables where the linear approximations of the nonlinear model can be considered acceptable. To this purpose, first of all, the stability of the equilibrium points of the closed-loop system is assessed by applying the eigenvalue analysis to appropriate piecewise-linear models. Admittedly, the dynamics of such a closed-loop system is affected by the perturbation of the poles caused by spillover and by the discrepancies between the linearized models of the plant and the one of the observer. Additionally, when nodal elastic displacements and velocities are not bounded in the infinitesimal neighborhoods of the equilibrium points, the difference between the nonlinear model and the locally linearized one is expressed in terms of unstructured uncertainty and stability is assessed through H robust analysis. The method is demonstrated by applying it to a closed-chain flexible link mechanism.

1.
Koutsoukos
,
X. D.
, and
Antsaklis
,
P. J.
, 2002, “
Design of Stabilizing Switching Control Laws for Discrete and Continuous-Time Linear Systems Using Piecewise-Linear Lyapunov Functions
,”
Int. J. Control
0020-7179,
75
, pp.
932
945
.
2.
Freidovich
,
L. B.
, and
Khalil
,
H. K.
, 2005, “
Logic-Based Switching for Robust Control of Minimum-Phase Nonlinear Systems
,”
Syst. Control Lett.
0167-6911,
54
(
8
), pp.
713
727
.
3.
Branicky
,
M. S.
, 1994, “
Stability of Switched and Hybrid Systems
,”
Proceedings of 33rd IEEE Conference on Decision and Control
,
Lake Buena Vista
, pp.
3498
3503
.
4.
Liberzon
,
D.
, and
Morse
,
A. S.
, 1999, “
Basic Problems in Stability and Design of Switched Systems
,”
IEEE Control Syst. Mag.
0272-1708,
19
(
5
), pp.
59
70
.
5.
Hespanha
,
J. P.
,
Liberzon
,
D.
, and
Morse
,
A. S.
, 2003, “
Overcoming the Limitation of Adaptive Control by Means of Logic-based Switching
,”
Syst. Control Lett.
0167-6911,
49
(
1
), pp.
49
65
.
6.
Hespanha
,
J. P.
,
Liberzon
,
D.
, and
Morse
,
A. S.
, 1999, “
Logic-Based Switching Control of a Nonholonomic System With Parametric Modeling Uncertainty
,”
Syst. Control Lett.
0167-6911,
38
(
8
), pp.
167
177
.
7.
Freidovich
,
L. B.
, and
Khalil
,
H. K.
, 2004, “
Comparison of Logic-based Switching Control Design for a Nonlinear System
,”
Proceedings of the American Control Conference
, pp.
1221
1222
.
8.
Corradi
,
M. L.
, and
Orlando
,
G.
, 2002, “
A Switching Controller for the Output Feedback Stabilization of Uncertain Interval Plants via Sliding Modes
,”
IEEE Trans. Autom. Control
0018-9286,
47
(
12
), pp.
2101
2107
.
9.
Marquez
,
H. J.
, and
Riaz
,
M.
, 2005, “
Robust State Observer Design With Application to an Industrial Boiler System
,”
Control Eng. Pract.
0967-0661,
13
(
6
), pp.
713
728
.
10.
Giovagnoni
,
M.
, 1994, “
A Numerical and Experimental Analysis of a Chain of Flexible Bodies
,”
ASME J. Dyn. Syst., Meas., Control
0022-0434
116
(
1
), pp.
73
80
.
11.
Caracciolo
,
R.
,
Gasparetto
,
A.
, and
Trevisani
,
A.
, 2001, “
Experimental Validation of a Dynamic Model for Flexible Link Mechanisms
,”
Proceedings ASME DETC 2001
,
Pittsburgh
,
PA
, pp.
461
468
.
12.
Gasparetto
,
A.
, 2001, “
Accurate Modelization of a Flexible-Link Planar Mechanism by Means of a Linearized Model in the State-Space Form for Design of a Vibration Controller
,”
J. Sound Vib.
0022-460X,
240
, pp.
241
262
.
13.
Caracciolo
,
R.
,
Gasparetto
,
A.
,
Rossi
,
A.
, and
Trevisani
,
A.
, 2003, “
Linearizzazione di modelli dinamici per meccanismi a membri deformabili
,”
Proceedings 16th AIMETA Conference of Theoretical and Applied Mechanics
,
Ferrara
,
Italy
, in Italian.
14.
Green
,
M.
,
Limebeer
,
D.
, 1996,
Linear Robust Control
,
Prentice-Hall, Englewood Cliffs
,
NJ
, Chap. 9.
15.
Balas
,
M. J.
, 1978, “
Feedback Control of Flexible Systems
,”
IEEE Trans. Autom. Control
0018-9286,
23
(
4
), pp.
673
679
.
16.
Kihas
,
D.
, and
Marquez
,
H. J.
, 2004, “
Computing the Distance Between a Nonlinear Model and Its Linear Approximation: An L2 Approach
,”
Comput. Chem. Eng.
0098-1354,
28
(
12
), pp.
2659
2666
.
17.
Chou
,
J. H.
,
Chen
,
S. H.
,
Chang
,
M. Y.
, and
Pan
,
A. J.
, 1997, “
Active Robust Vibration Control of Flexible Composite Beams With Parameter Perturbation
,”
Int. J. Mech. Sci.
0020-7403,
39
(
7
), pp.
751
760
.
18.
Liao
,
W. H.
,
Chou
,
J. H.
, and
Horng
,
I. R.
, 2001, “
Robust Observer-Based Frequency-Shaping Optimal Vibration Control of Uncertain Flexible Linkage Mechanisms
,”
Appl. Math. Model.
0307-904X,
25
(
11
), pp.
923
936
.
19.
Caracciolo
,
R.
,
Richiedei
,
D.
,
Trevisani
,
A.
, and
Zanotto
,
V.
, 2005, “
Robust Mixed-Norm Position and Vibration Control of Flexible Link Mechanisms
,”
Mechatronics
0957-4158,
15
(
7
), pp.
767
791
.
You do not currently have access to this content.