This paper presents control laws for distributed parameter systems of parabolic and hyperbolic types which, on the one hand ensure robustness with respect to small dynamic uncertainties and disturbances, and on the other hand, permit on-line plant parameter estimation. The novelty of the algorithms proposed is (a) in the construction of a sliding mode-based state derivative observer and (b) in the inclusion of this observer into a model reference adaptive controller which thereby regularizes the ill-posed identification problem itself. Apart from this, the controllers constructed do not suffer from on-line computation of spatial derivatives of the measurement data, and hence they are of reduced sensitivity with respect to the measurement noise. [S0022-0434(00)02104-3]

1.
Landau, Y. D., 1979, Adaptive Control - The Model Reference Approach. Marcel Dekker, New York.
2.
Bentsman, J., and Orlov, Y. V., “Reduced spatial order model reference adaptive control of spatially varying distributed parameter systems of parabolic and hyperbolic types,” Int. J. Adapt. Control Signal Proc. (to be published).
3.
Bo¨hm
,
M.
,
Demetriou
,
M. A.
,
Reich
,
S.
, and
Rosen
,
I. G.
,
1997
, “
Model reference adaptive control of distributed parameter systems
,”
SIAM J. Control Optim.
,
35
, pp.
678
713
.
4.
Hong
,
K. S.
, and
Bentsman
,
J.
,
1994
, “
Direct adaptive control of parabolic systems: algorithm synthesis and convergence and stability analysis
,”
IEEE Trans. Autom. Control
,
AC-39
, pp.
2018
2033
.
5.
Bamieh, B. A., 1997, “The structure of optimal controllers of spatially-invariant distributed parameter systems,” Proc. 36th IEEE Conf. on Decision and Control, pp. 1056–1061.
6.
Friedman, A., 1969, Partial Differential Equations, Holt, Reinhart, and Winston, New York.
7.
Krasnoselskii, M. A., et al., 1976, Integral Operators in Spaces of Summable Functions, Noordhoff, Leyden.
8.
Utkin, V. I., 1992, Sliding Modes in Control Optimization. Springer-Verlag, Berlin.
9.
Orlov
,
Y. V.
,
2000
, “
Discontinuous unit feedback control of uncertain infinite-dimensional systems
,”
IEEE Trans. Autom. Control
,
AC-45
, pp.
834
844
.
10.
Kravaris
,
C.
, and
Seinfeld
,
J. H.
,
1985
, “
Identification of parameters in distributed parameter systems by regularization
,”
SIAM J. Control Optim.
,
23
, pp.
217
241
.
11.
Orlov
,
V. Yu.
, and
Bentsman
,
J.
,
2000
, “
Adaptive Distributed Parameter Systems Identification with Enforceable Identifiability Conditions and Reduced Order Spatial Differentiation
,”
IEEE Trans. Autom. Control
,
AC-45
, pp.
203
216
.
You do not currently have access to this content.