1998
DOI: 10.1016/s0167-6911(98)00017-6
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Nonlinear observer design using Lyapunov’s auxiliary theorem

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Cited by 385 publications
(203 citation statements)
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“…Such systems take the general form: [17] or the design of Kazantzis-Kravaris observers [18] lead to an approximate form that can be represented by (1) with ω(t) representing an unstructured uncertainty arising from the approximation.…”
Section: Remarkmentioning
confidence: 99%
“…Such systems take the general form: [17] or the design of Kazantzis-Kravaris observers [18] lead to an approximate form that can be represented by (1) with ω(t) representing an unstructured uncertainty arising from the approximation.…”
Section: Remarkmentioning
confidence: 99%
“…We consider a generalization of the approach of [9] to develop a set of conditions that are necessary and sufficient for the solution of a general observer linearization problem in which both output-dependent diffeomorphisms and output-dependent time-scaling transformations are considered. Although the problem is not as general as the problem treated in [11] and [12], the study demonstrates that the class of nonlinear systems that are diffeomorphic to systems whose error dynamics are linear can be extended by considering a simultaneous change of output and time-scale transformation. The main result of this paper confirms that the application of a combined output diffeomorphism and a time-scale transformation allows one to tackle a more general class of systems.…”
Section: Introductionmentioning
confidence: 99%
“…In [11] and [12], the observer linearization problem was addressed in its most general formulation. Conditions are derived for the existence of an approximate solution to a nonlinear partial differential equation whose solution provides a state-space diffeomorphism that transforms the system into an observer with approximately linear error dynamics.…”
Section: Introductionmentioning
confidence: 99%
“…This approach was developed through a Lyapunov-based observer from the work of Kazantzis and Kravaris. 12 The preceding finite time observer design approaches were carried out without considering disturbances in the measurements or dynamics. Such disturbances are usually present in practical applications and they affect measurements and can be state dependent.…”
Section: Introductionmentioning
confidence: 99%