Add to ORKGBrockett's necessary condition yields a test to determine whether a system can be made to stabilize about some operating point via continuous, purely state-dependent feedback. For many real-world systems, however, one wants to stabilize sets which are more general than a single point. One also wants to control such systems to operate safely by making obstacles and other "dangerous" sets repelling. We generalize Brockett's necessary condition to the case of stabilizing general compact subsets having a nonzero Euler characteristic in general ambient state spaces (smooth manifolds). Using this generalization, we also formulate a necessary condition for the existence of "safe" control laws. We illustrate the theory in concrete examples and fo...
The dynamics of non holonomic mechanical system are described by the classical Euler-Lagrange equati...
In this thesis we study the stabilization of closed sets for passive nonlinear control systems, deve...
For a broad class of nonlinear systems, we formulate the problem of guaranteeing safety with optimal...
Brockett\u27s theorem states the three necessary conditions for the existence of a continuously diff...
Abstract. We show that any globally asymptotically controllable system on any smooth manifold can be...
We consider the simplest design problem for nonlinear systems: the problem of rendering asymptotical...
This paper proposes an optimization with penalty-based feedback design framework for safe stabilizat...
Necessary conditions for asymptotic stability and stabilizability of subsets of dynamical and contro...
Elements of the differential topology are used to prove necessary conditions for stabilizability in ...
36 pages, 7 figuresWe construct a patchy feedback for a general control system on $\R^n$ which reali...
Some theorems of viability theory which are relevant to nonlinear control problems with state constr...
We design a new feedback law to stabilize a linear infinite-dimensional control system, where the st...
In this paper we derive necessary and sufficient conditions of stabilizability for multi-input nonli...
AbstractThis paper deals with the concept of stability in the sense of Lagrange or more simply as La...
. A machinery is developed for the explicit construction of locally Holder continuous feedback laws ...
The dynamics of non holonomic mechanical system are described by the classical Euler-Lagrange equati...
In this thesis we study the stabilization of closed sets for passive nonlinear control systems, deve...
For a broad class of nonlinear systems, we formulate the problem of guaranteeing safety with optimal...
Brockett\u27s theorem states the three necessary conditions for the existence of a continuously diff...
Abstract. We show that any globally asymptotically controllable system on any smooth manifold can be...
We consider the simplest design problem for nonlinear systems: the problem of rendering asymptotical...
This paper proposes an optimization with penalty-based feedback design framework for safe stabilizat...
Necessary conditions for asymptotic stability and stabilizability of subsets of dynamical and contro...
Elements of the differential topology are used to prove necessary conditions for stabilizability in ...
36 pages, 7 figuresWe construct a patchy feedback for a general control system on $\R^n$ which reali...
Some theorems of viability theory which are relevant to nonlinear control problems with state constr...
We design a new feedback law to stabilize a linear infinite-dimensional control system, where the st...
In this paper we derive necessary and sufficient conditions of stabilizability for multi-input nonli...
AbstractThis paper deals with the concept of stability in the sense of Lagrange or more simply as La...
. A machinery is developed for the explicit construction of locally Holder continuous feedback laws ...
The dynamics of non holonomic mechanical system are described by the classical Euler-Lagrange equati...
In this thesis we study the stabilization of closed sets for passive nonlinear control systems, deve...
For a broad class of nonlinear systems, we formulate the problem of guaranteeing safety with optimal...