We generalize the theory of Input-to-State Stability (ISS) and of its characterizations by means of Lyapunov dissipation inequalities to the study of systems admitting invariant sets, which are not necessarily stable in the sense of Lyapunov but admit a suitable hierarchical decomposition. It is the latter which allows to greatly extend the class of systems to which ISS theory can be applied, allowing in a unified treatment to deal with oscillators in Euclidean coordinates, almost globally asymptotically stable systems on manifolds, systems with multiple equilibria in Rn just to name a few
We show that the well-known Lyapunov sufficient condition for “input-to-state stability ” is also ne...
International audienceThis paper deals with a robust synchronization problem for multistable systems...
International audienceIn a pedagogical but exhaustive manner, this survey reviews the main results o...
International audienceWe generalize the theory of Input-to-State Stability (ISS) and of its characte...
We extend the classical integral Input-to-State Stability (iISS) theory to systems evolving on compl...
We provide partial Lyapunov characterizations for a recently proposed generalization of input-to-sta...
Abstract. A new definition of almost global Input-to-State Stability for systems on differentiable m...
As central topics in systems and control theory, the study of stability, robustness, and sensitivity...
In a recent paper Angeli and Efimov (2015), the notion of Input-to-State Stability (ISS) has been ge...
International audienceA necessary and sufficient criterion to establish input-to-state stability (IS...
A necessary and sufficient criterion to establish input-to-state stability (ISS) of nonlinear dynami...
In recent papers, the notions of Input-to-State Stability (ISS) and Integral ISS (iISS) have been ge...
We show that the well-known Lyapunov sufficient condition for "input-to-state stability" i...
International audienceThe input-to-state stability property of nonlinear dynamical systems with mult...
Output-to-State Stability (OSS) is a notion of detectability for nonlinear systems that is formulate...
We show that the well-known Lyapunov sufficient condition for “input-to-state stability ” is also ne...
International audienceThis paper deals with a robust synchronization problem for multistable systems...
International audienceIn a pedagogical but exhaustive manner, this survey reviews the main results o...
International audienceWe generalize the theory of Input-to-State Stability (ISS) and of its characte...
We extend the classical integral Input-to-State Stability (iISS) theory to systems evolving on compl...
We provide partial Lyapunov characterizations for a recently proposed generalization of input-to-sta...
Abstract. A new definition of almost global Input-to-State Stability for systems on differentiable m...
As central topics in systems and control theory, the study of stability, robustness, and sensitivity...
In a recent paper Angeli and Efimov (2015), the notion of Input-to-State Stability (ISS) has been ge...
International audienceA necessary and sufficient criterion to establish input-to-state stability (IS...
A necessary and sufficient criterion to establish input-to-state stability (ISS) of nonlinear dynami...
In recent papers, the notions of Input-to-State Stability (ISS) and Integral ISS (iISS) have been ge...
We show that the well-known Lyapunov sufficient condition for "input-to-state stability" i...
International audienceThe input-to-state stability property of nonlinear dynamical systems with mult...
Output-to-State Stability (OSS) is a notion of detectability for nonlinear systems that is formulate...
We show that the well-known Lyapunov sufficient condition for “input-to-state stability ” is also ne...
International audienceThis paper deals with a robust synchronization problem for multistable systems...
International audienceIn a pedagogical but exhaustive manner, this survey reviews the main results o...