Add to ORKGInternational audienceLet $M$ be a smooth connected and complete manifold of dimension $n$, and $\Delta$ be a smooth nonholonomic distribution of rank $m\leq n$ on $M$. We prove that, if there exists a smooth Riemannian metric on $\Delta$ for which no nontrivial singular path is minimizing, then there exists a smooth repulsive stabilizing section of $\Delta$ on $M$. Moreover, in dimension three, the assumption of the absence of singular minimizing horizontal paths can be dropped in the Martinet case. The proofs are based on the study, using specific results of nonsmooth analysis, of an optimal control problem of Bolza type, for which we prove that the corresponding value function is semiconcave and is a viscosity solution of a Hamilton-Jaco...
We show that any globally asymptotically controllable system on any smooth manifold can be globally ...
We study reaction-diffusion equations in cylinders with possibly nonlinear diffusion and possibly no...
Abstract: The relationship between a minimization problem on the innite horizon and local stabilizab...
We present the stabilization problem in the context of nonholonomic control systems and nonholonomic...
International audienceGiven an affine control system in $\R^3$ subject to the Hörmander's condition at...
AbstractLet the equation x¨=f(t,x) be periodic in time, and let the equilibrium x∗≡0 be a periodic m...
In this paper we extend the matching technique to a class of nonholonomic systems with symmetries. ...
A new technique for stabilizing nonholonomic systems to trajectories is presented. It is well known ...
International audienceWe study the general problem of globally asymp- totically controllable affine sy...
AbstractFor infinite horizon nonlinear optimal control problems in which the control term enters lin...
The authors present a control law for globally asymptotically stabilizing a class of controllable no...
A result due to M.W. Hirsch states that most competitive maps admit a carrying simplex, i.e., an inv...
summary:We discuss regularity results concerning local minimizers $u: \mathbb R^n\supset \Omega\righ...
We study reaction-diffusion equations in cylinders with possibly nonlinear diffusion and possibly no...
International audienceWe study the general problem of stabilization of globally asymptotically contr...
We show that any globally asymptotically controllable system on any smooth manifold can be globally ...
We study reaction-diffusion equations in cylinders with possibly nonlinear diffusion and possibly no...
Abstract: The relationship between a minimization problem on the innite horizon and local stabilizab...
We present the stabilization problem in the context of nonholonomic control systems and nonholonomic...
International audienceGiven an affine control system in $\R^3$ subject to the Hörmander's condition at...
AbstractLet the equation x¨=f(t,x) be periodic in time, and let the equilibrium x∗≡0 be a periodic m...
In this paper we extend the matching technique to a class of nonholonomic systems with symmetries. ...
A new technique for stabilizing nonholonomic systems to trajectories is presented. It is well known ...
International audienceWe study the general problem of globally asymp- totically controllable affine sy...
AbstractFor infinite horizon nonlinear optimal control problems in which the control term enters lin...
The authors present a control law for globally asymptotically stabilizing a class of controllable no...
A result due to M.W. Hirsch states that most competitive maps admit a carrying simplex, i.e., an inv...
summary:We discuss regularity results concerning local minimizers $u: \mathbb R^n\supset \Omega\righ...
We study reaction-diffusion equations in cylinders with possibly nonlinear diffusion and possibly no...
International audienceWe study the general problem of stabilization of globally asymptotically contr...
We show that any globally asymptotically controllable system on any smooth manifold can be globally ...
We study reaction-diffusion equations in cylinders with possibly nonlinear diffusion and possibly no...
Abstract: The relationship between a minimization problem on the innite horizon and local stabilizab...