The paper presents two mechanisms for global oscillations in feedback systems, based on bifurcations in absolutely stable systems. The external characterization of the oscillators provides the basis for a (energy-based) dissipativity theory for oscillators, thereby opening new possibilities for rigorous stability analysis of high-dimensional systems and interconnected oscillators. (C) 2004 Elsevier B.V. All rights reserved
The trivial equilibrium of a van der Pol-Duffing oscillator under a linear-plus-nonlinear feedback c...
New Lyapunov-like conditions for oscillatority of dynamical systems in the sense of Yakubovich are ...
peer reviewedSufficient conditions of global attracting limit cycle existence for Lurie system with ...
The paper presents two mechanisms for global oscillations in feedback systems, based on bifurcations...
The paper presents two mechanisms for global oscillations in feedback systems, based on bifurcations...
This paper employs dissipativity theory for the global analysis of limit cycles in particular dynami...
peer reviewedThis paper is concerned with the global analysis of synchrone oscillations in special ...
International audienceMany biological oscillators have a cyclic structure consisting of negative fee...
A complex Ginzburg-Landau equation subjected to local and global time-delay feedback terms is consid...
This paper introduces a method for obtaining stable and robust self-sustained oscillations in a clas...
Abstract—We present new results on the synthesis of globally stable limit cycles in networks of pass...
A ring oscillator is a system in which one species regulates the next, which regulates the next and ...
The chapter presents an expository survey of ongoing research by the author on a system theory for ...
AbstractThe study of dynamics of gene regulatory networks is of increasing interest in systems biolo...
Oscillations in networks composed of Cyclic Negative Feedback systems (CNF systems) are widely used ...
The trivial equilibrium of a van der Pol-Duffing oscillator under a linear-plus-nonlinear feedback c...
New Lyapunov-like conditions for oscillatority of dynamical systems in the sense of Yakubovich are ...
peer reviewedSufficient conditions of global attracting limit cycle existence for Lurie system with ...
The paper presents two mechanisms for global oscillations in feedback systems, based on bifurcations...
The paper presents two mechanisms for global oscillations in feedback systems, based on bifurcations...
This paper employs dissipativity theory for the global analysis of limit cycles in particular dynami...
peer reviewedThis paper is concerned with the global analysis of synchrone oscillations in special ...
International audienceMany biological oscillators have a cyclic structure consisting of negative fee...
A complex Ginzburg-Landau equation subjected to local and global time-delay feedback terms is consid...
This paper introduces a method for obtaining stable and robust self-sustained oscillations in a clas...
Abstract—We present new results on the synthesis of globally stable limit cycles in networks of pass...
A ring oscillator is a system in which one species regulates the next, which regulates the next and ...
The chapter presents an expository survey of ongoing research by the author on a system theory for ...
AbstractThe study of dynamics of gene regulatory networks is of increasing interest in systems biolo...
Oscillations in networks composed of Cyclic Negative Feedback systems (CNF systems) are widely used ...
The trivial equilibrium of a van der Pol-Duffing oscillator under a linear-plus-nonlinear feedback c...
New Lyapunov-like conditions for oscillatority of dynamical systems in the sense of Yakubovich are ...
peer reviewedSufficient conditions of global attracting limit cycle existence for Lurie system with ...