In this paper, we address the problem of stabilisation of robots subject to nonholonommic constraints and external disturbances using port-Hamiltonian theory and smooth time-invariant control laws. This should be contrasted with the commonly used switched or time-varying laws. We propose a control design that provides asymptotic stability of an manifold (also called relative equilibria) - due to the Brockett condition this is the only type of stabilisation possible using smooth time-invariant control laws. The equilibrium manifold can be shaped to certain extent to satisfy specific control objectives. The proposed control law also incorporates integral action, and thus the closed-loop system is robust to unknown constant disturbances. A key...
A new technique for stabilizing nonholonomic systems to trajectories is presented. It is well known ...
Brockett\u27s theorem states the three necessary conditions for the existence of a continuously diff...
This dissertation is concerned with dynamic modeling and kinematic control of constrained mechanical...
In this paper, we address the problem of stabilisation of robots subject to nonholonommic constraint...
International audienceIn this paper, we address the problem of stabilisation of robots subject to no...
International audienceIn this paper, we address the problem of stabilisation of robots subject to no...
A novel method for asymptotic stabilization of a class of non-holonomic systems is presented. The me...
A theoretical framework is established for the control of nonholonomic dynamic systems, i.e. dynamic...
. In this paper we present time invariant controllers which globally asymptotically stabilize a simp...
This work presents some results on the application of the Immersion & Invariance (I&I) approach prop...
Abstract. In this paper it is shown that a class of n-dimensional nonholonomic chained systems can b...
International audienceThis paper is dedicated to the control of some classes of mechanical systems, ...
This paper studies formation keeping control of a network of nonholonomic wheeled robots within the ...
This paper presents some preliminary results on asymptotic stabilization of nonholonomic mechanical ...
Nonlinear control of mechanical systems is a challenging discipline that lies at the intersection be...
A new technique for stabilizing nonholonomic systems to trajectories is presented. It is well known ...
Brockett\u27s theorem states the three necessary conditions for the existence of a continuously diff...
This dissertation is concerned with dynamic modeling and kinematic control of constrained mechanical...
In this paper, we address the problem of stabilisation of robots subject to nonholonommic constraint...
International audienceIn this paper, we address the problem of stabilisation of robots subject to no...
International audienceIn this paper, we address the problem of stabilisation of robots subject to no...
A novel method for asymptotic stabilization of a class of non-holonomic systems is presented. The me...
A theoretical framework is established for the control of nonholonomic dynamic systems, i.e. dynamic...
. In this paper we present time invariant controllers which globally asymptotically stabilize a simp...
This work presents some results on the application of the Immersion & Invariance (I&I) approach prop...
Abstract. In this paper it is shown that a class of n-dimensional nonholonomic chained systems can b...
International audienceThis paper is dedicated to the control of some classes of mechanical systems, ...
This paper studies formation keeping control of a network of nonholonomic wheeled robots within the ...
This paper presents some preliminary results on asymptotic stabilization of nonholonomic mechanical ...
Nonlinear control of mechanical systems is a challenging discipline that lies at the intersection be...
A new technique for stabilizing nonholonomic systems to trajectories is presented. It is well known ...
Brockett\u27s theorem states the three necessary conditions for the existence of a continuously diff...
This dissertation is concerned with dynamic modeling and kinematic control of constrained mechanical...