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Stability analysis of nonlinear Lyapunov systems associated with an $n$ th order system of matrix differential equations.

Murty, K. N., Shaw, Michael D. (2002)

Journal of Applied Mathematics and Stochastic Analysis

Stability analysis of periodically switched linear systems using Floquet theory.

Gökçek, Cevat (2004)

Mathematical Problems in Engineering

Stability analysis of sliding-mode feedback control

Francis Clarke, Richard Vinter (2009)

Control and Cybernetics

Stability analysis of solutions to an optimal control problem associated with a Goursat-Darboux problem

Dariusz Idczak, Marek Majewski, Stanisław Walczak (2003)

International Journal of Applied Mathematics and Computer Science

In the present paper, some results concerning the continuous dependence of optimal solutions and optimal values on data for an optimal control problem associated with a Goursat-Darboux problem and an integral cost functional are derived.

Stability and boundedness of controllable continuous flows

František Tumajer (1988)

Aplikace matematiky

In the paper the concept of a controllable continuous flow in a metric space is introduced as a generalization of a controllable system of differential equations in a Banach space, and various kinds of stability and of boundedness of this flow are defined. Theorems stating necessary and sufficient conditions for particular kinds of stability and boundedness are formulated in terms of Ljapunov functions.

Stability and controllability of the electromagneto-elastic system.

Nicaise, S. (2003)

Portugaliae Mathematica. Nova Série

Stability and robust stability of 2D discrete stochastic systems.

Cui, Jia-Rui, Hu, Guang-Da, Zhu, Qiao (2011)

Discrete Dynamics in Nature and Society

Stability and sliding modes for a class of nonlinear time delay systems

Vladimir B. Răsvan (2011)

Mathematica Bohemica

The following time delay system $\dot{x} = A x (t) + \sum_{1}^{r} b q_{i}^{*} x (t - τ_{i}) - b ϕ (c^{*} x (t))$ is considered, where $ϕ : ℝ \to ℝ$ may have discontinuities, in particular at the origin. The solution is defined using the “redefined nonlinearity” concept. For such systems sliding modes are discussed and a frequency domain inequality for global asymptotic stability is given.

Stability and stabilizability of a class of uncertain dynamical systems with delays

Mohammed Saadni, Driss Mehdi (2005)

International Journal of Applied Mathematics and Computer Science

This paper deals with a class of uncertain systems with time-varying delays and norm-bounded uncertainty. The stability and stabilizability of this class of systems are considered. Linear Matrix Inequalities (LMI) delay-dependent sufficient conditions for both stability and stabilizability and their robustness are established.

Stability and stabilizability of dynamical systems with multiple time-varying delays: Delay-dependent criteria.

Mehdi, D., Boukas, E.K. (2003)

Mathematical Problems in Engineering