Systems that can be decomposed as feedback interconnections of stable linear blocks and periodic nonlinearities arise in many physical and engineering applications. The relevant models e.g. describe oscillations of a viscously damped pendulum, synchronization circuits (phase, frequency and delay locked loops) and networks of coupled power generators. A system with periodic nonlinearities usually has multiple equilibria (some of them being locally unstable). Many tools of classical stability and control theories fail to cope with such systems. One of the efficient methods, elaborated to deal with periodic nonlinearities, stems from the celebrated Popov method of 'integral indices', or integral quadratic constraints; this method leads, in par...
The concept of cycle slipping was introduced by J.J. Stocker for the mathematical pendulum with fric...
The main objective of control theory has long focused on the stability analysis of system equilibriu...
International audienceMany dynamical systems are periodic with respect to several state variables. T...
Systems that can be decomposed as feedback interconnections of stable linear blocks and periodic non...
In this paper, systems of nonlinear integro-differential Volterra equations are examined that can be...
Many engineering applications employ nonlinear systems, representable as a feedback interconnection ...
Singularly perturbed integro-differential Volterra equations with MIMO periodic nonlinearities are c...
International audienceA wide range of practical systems exhibits dynamics , which are periodic with ...
This paper is concerned with stability properties of a Lur'e system obtained by interconnection of a...
A wide range of practical systems exhibits dynamics, which are periodic with respect to several stat...
Starting from pioneering works by Lur’e, Popov and Zames, global stability theory for nonlinear cont...
A wide range of practical systems exhibits dynamics, which are periodic with respect to several stat...
This thesis is being archived as a Digitized Shelf Copy for campus access to current students and st...
Limit cycles or, more general, periodic solutions of nonlinear dynamical systems occur in many diffe...
In several systems, the physical parameters of the system vary over time or operating points. A popu...
The concept of cycle slipping was introduced by J.J. Stocker for the mathematical pendulum with fric...
The main objective of control theory has long focused on the stability analysis of system equilibriu...
International audienceMany dynamical systems are periodic with respect to several state variables. T...
Systems that can be decomposed as feedback interconnections of stable linear blocks and periodic non...
In this paper, systems of nonlinear integro-differential Volterra equations are examined that can be...
Many engineering applications employ nonlinear systems, representable as a feedback interconnection ...
Singularly perturbed integro-differential Volterra equations with MIMO periodic nonlinearities are c...
International audienceA wide range of practical systems exhibits dynamics , which are periodic with ...
This paper is concerned with stability properties of a Lur'e system obtained by interconnection of a...
A wide range of practical systems exhibits dynamics, which are periodic with respect to several stat...
Starting from pioneering works by Lur’e, Popov and Zames, global stability theory for nonlinear cont...
A wide range of practical systems exhibits dynamics, which are periodic with respect to several stat...
This thesis is being archived as a Digitized Shelf Copy for campus access to current students and st...
Limit cycles or, more general, periodic solutions of nonlinear dynamical systems occur in many diffe...
In several systems, the physical parameters of the system vary over time or operating points. A popu...
The concept of cycle slipping was introduced by J.J. Stocker for the mathematical pendulum with fric...
The main objective of control theory has long focused on the stability analysis of system equilibriu...
International audienceMany dynamical systems are periodic with respect to several state variables. T...