Reliable control of uncertain nonlinear systems
From MaRDI portal
Publication:1295040
DOI10.1016/S0005-1098(98)00027-2zbMath0942.93007OpenAlexW1966591982WikidataQ126551358 ScholiaQ126551358MaRDI QIDQ1295040
Yuqiong Liu, Guang-Hong Yang, Jian Liang Wang
Publication date: 1 December 1999
Published in: Automatica (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/s0005-1098(98)00027-2
uncertaintyrobust stabilitynonlinear system\(H_{\infty}\) controlprimary contingency reliable control problem
Stabilization of systems by feedback (93D15) Reliability, availability, maintenance, inspection in operations research (90B25) (H^infty)-control (93B36) Robust stability (93D09)
Related Items (12)
Robust fault-tolerant \(\mathcal H_\infty\) control for offshore steel jacket platforms via sampled-data approach ⋮ Robust reliable \(H_\infty \) control for uncertain nonlinear systems via LMI approach ⋮ Robust reliable stabilization of switched nonlinear systems with time-varying delays and delayed switching ⋮ Master-slave synchronization for nonlinear systems via reliable control with Gaussian stochastic process ⋮ Robust reliable control for uncertain time-delay systems with IQC performance ⋮ ReliableH∞control for discrete uncertain time-delay systems with randomly occurring nonlinearities: the output feedback case ⋮ Robust reliable control for discrete-time-delay systems with stochastic nonlinearities and multiplicative noises ⋮ Robust reliable control for uncertain switched nonlinear systems with time delay under asynchronous switching ⋮ Robust reliable stabilization of stochastic switched nonlinear systems under asynchronous switching ⋮ Robust \(L_\infty \) reliable control for uncertain nonlinear switched systems with time delay ⋮ Reliable control for linear systems with time-varying delays and parameter uncertainties ⋮ Finite-horizon reliable control with randomly occurring uncertainties and nonlinearities subject to output quantization
This page was built for publication: Reliable control of uncertain nonlinear systems
