In this paper we go on with the analysis of the asymptotic behavior of Lur'e-type systems with periodic nonlinearities and infinite sets of equilibria. It is well known by now that this class of systems can not be efficiently investigated by the second Lyapunov method with the standard Lur'e-Postnikov function ("a quadratic form plus an integral of the nonlinearity"). So several new methods have been elaborated within the framework of Lyapunov direct method. The nonlocal reduction technique proposed by G.A. Leonov in the 1980s is based on the comparison principle. The feedback system is reduced to a low-order system with the same nonlinearity and known asymptotic behavior. Its trajectories are injected into Lyapunov function of the original...
We previously proposed a parametric controller to avoid undesirable bifurcations of stable fixed and...
For a quite general class of dynamic systems having a single memoryless time-varying nonlinearity in...
The stability of equilibrium points of large scale dynamical systems described by differential equat...
Starting from pioneering works by Lur’e, Popov and Zames, global stability theory for nonlinear cont...
The paper is devoted to asymptotic behavior of synchronization systems, i.e. Lur'e–type systems with...
This paper is concerned with stability properties of a Lur'e system obtained by interconnection of a...
The paper proposes a numerical algorithm for constructing Lyapunov spline functions for investigatin...
The paper proposes a numerical algorithm for constructing Lyapunov functions for investigating the a...
The paper proposes a numerical algorithm for constructing piecewise linear Lyapunov functions for in...
The second edition of this textbook provides a single source for the analysis of system models repre...
In this survey, we introduce the notion of stability of time varying nonlinear systems. In particula...
peer reviewedSufficient conditions of global attracting limit cycle existence for Lurie system with ...
A wide range of practical systems exhibits dynamics, which are periodic with respect to several stat...
International audienceMany dynamical systems are periodic with respect to several state variables. T...
Abstract. We study stability and stabilizability properties of systems with discontinuous righthand ...
We previously proposed a parametric controller to avoid undesirable bifurcations of stable fixed and...
For a quite general class of dynamic systems having a single memoryless time-varying nonlinearity in...
The stability of equilibrium points of large scale dynamical systems described by differential equat...
Starting from pioneering works by Lur’e, Popov and Zames, global stability theory for nonlinear cont...
The paper is devoted to asymptotic behavior of synchronization systems, i.e. Lur'e–type systems with...
This paper is concerned with stability properties of a Lur'e system obtained by interconnection of a...
The paper proposes a numerical algorithm for constructing Lyapunov spline functions for investigatin...
The paper proposes a numerical algorithm for constructing Lyapunov functions for investigating the a...
The paper proposes a numerical algorithm for constructing piecewise linear Lyapunov functions for in...
The second edition of this textbook provides a single source for the analysis of system models repre...
In this survey, we introduce the notion of stability of time varying nonlinear systems. In particula...
peer reviewedSufficient conditions of global attracting limit cycle existence for Lurie system with ...
A wide range of practical systems exhibits dynamics, which are periodic with respect to several stat...
International audienceMany dynamical systems are periodic with respect to several state variables. T...
Abstract. We study stability and stabilizability properties of systems with discontinuous righthand ...
We previously proposed a parametric controller to avoid undesirable bifurcations of stable fixed and...
For a quite general class of dynamic systems having a single memoryless time-varying nonlinearity in...
The stability of equilibrium points of large scale dynamical systems described by differential equat...