Abstract:
Practically, system dynamics are nonlinear, requiring the estimation of unknown
states, which encourages the observer schemes to be implanted in control structures.
This dissertation presents estimation and ltering of the Lipschitz and
one-sided Lipschitz nonlinear systems and provides robustness against L2 normbounded
disturbances and parameter uncertainties for state estimation. The developed
approaches overcome the practical consequences of time-delays, perturbations
and disturbances. Robust state estimation for Lipschitz and one-sided
Lipschitz nonlinear systems is established by the adoption of Luenberger-like observer
scheme, which is extended to the generalized ltering scheme to exhibit
diverging manifolds, namely, the conventional static-gain lter and dynamic lter
as speci c scenarios. Further, the presented estimation schemes unfolded the
application based designs, including observer-based control of the nonlinear systems.
Observer-based controller application is a duple process: It requires the
estimation of unknown states at rst step, while in second stage, a controller
is designed using these estimated states. A decoupling condition, necessary and
su cient, for the presented approach, is explored to obtain controller and observer
gains. Moreover, the controller scheme is further extended to overcome
time-varying parametric uncertainties and norm-bounded disturbances. Convex
optimization is adopted to solve the nonlinear constraints by combining nested
bilinear-term-solver approach with a nonlinear optimization-based cone complimentary
linearization. Comprehending the contributions of this dissertation, robust
estimation based approaches for Lipschitz and one-sided Lipschitz systems
are explored under output delays. Delay-range-dependent stability criterion is
adopted to establish the stability, which foregrounds less conservative schemes.
Robust generalized ltering for delayed nonlinear systems extends the concept of
estimation to lter the noises and perturbations. Furthermore, robust estimation
scheme for the nonlinear systems against parametric uncertainties is provided under
measurement delay. Robust observer-based controller schemes as applications
of the proposed estimation methods are studied. Numerical simulation results of
practical systems are provided.