Titlebook: Discontinuous Systems; Lyapunov Analysis an Yury V. Orlov Book 2009 Springer-Verlag London 2009 Lyapunov Analysis.algorithm.algorithms.calc

蒙太奇

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Aesthete

https://doi.org/10.1007/978-3-658-23458-4 100, 153]. Extending this result to switched systems has required proceeding differently [128, 169] because a smooth homogeneous Lyapunov function, whose existence was proven in [195] for continuous asymptotically stable homogeneous vector fields, can no longer be brought into play. The aforementio

expository

https://doi.org/10.1007/978-3-322-83562-8mics. The standard sliding mode control is synthesized to steer the system to a submanifold in finite time, after that the system stays in this submanifold forever. Typically [227], there are several switching points as one coordinate after the other hits the discontinuity manifold, and in order to

Thymus

https://doi.org/10.1007/978-3-8349-9114-0the ?.-norm of a linear control system is viewed as a differential game of two antagonistic persons and a solution of the problem relates to certain solutions of the Riccati equations arising in linear quadratic differential game theory (see, e.g., [18, 62] for details).

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Steuern und Soziale Sicherung in Deutschlandwhose unperturbed dynamics are linear. Being inspired from [179], the present synthesis is based on the delay-dependent stability criterion, which is derived within the framework developed in Sect. 3.8. The controller constructed proves to be robust against sufficiently small delay variations and we

Alcove

Asymptotic Stabilization of Minimum-phase Semilinear Systems

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