We apply methods of the so-called "inverse problem of the calculus of variations" to the stabilization of an equilibrium of a class of two-dimensional controlled mechanical systems. The class is general enough to include, among others, the inverted pendulum on a cart and the inertia wheel pendulum. By making use of a condition that follows from Douglas' classification, we derive feedback controls for which the control system is variational. We then use the energy of a suitable controlled Lagrangian to provide a stability criterion for the equilibrium
The paper adresses the problem of stabilization of a specific target position of underactuated Lagra...
The method of controlled Lagrangians is a technique for stabilizing relative equilibria of mechanic...
Many interesting control systems are mechanical control systems. In spite of this, there has not bee...
We apply methods of the so-called "inverse problem of the calculus of variations" to the stabilizati...
We describe a class of mechanical systems for which the “method of controlled Lagrangians” provides ...
We develop a method for the stabilization of mechanical systems with symmetry based on the technique...
Obtains feedback stabilization of an inverted pendulum on a rotor arm by the “method of controlled L...
For pt.I, see ibid., vol.45, p.2253-70 (2000). We extend the method of controlled Lagrangians (CL) t...
We extend the method of controlled Lagrangians to include potential shaping for complete state-space...
This paper is an outgrowth of the work of Bloch, Krishnaprasad, Marsden and Sánchez de Alvarez [1992...
We describe the effect of physical dissipation on stability of equilibria which have been stabilize...
Controlled Lagrangian and matching techniques are developed for the stabilization of relative equili...
The method of controlled Lagrangians for discrete mechanical systems is extended to include potenti...
This paper discusses the matching conditions resulting from the controlled Lagrangians method and th...
The so-called inverse problem of dynamics is about constructing a potential for a given family of cu...
The paper adresses the problem of stabilization of a specific target position of underactuated Lagra...
The method of controlled Lagrangians is a technique for stabilizing relative equilibria of mechanic...
Many interesting control systems are mechanical control systems. In spite of this, there has not bee...
We apply methods of the so-called "inverse problem of the calculus of variations" to the stabilizati...
We describe a class of mechanical systems for which the “method of controlled Lagrangians” provides ...
We develop a method for the stabilization of mechanical systems with symmetry based on the technique...
Obtains feedback stabilization of an inverted pendulum on a rotor arm by the “method of controlled L...
For pt.I, see ibid., vol.45, p.2253-70 (2000). We extend the method of controlled Lagrangians (CL) t...
We extend the method of controlled Lagrangians to include potential shaping for complete state-space...
This paper is an outgrowth of the work of Bloch, Krishnaprasad, Marsden and Sánchez de Alvarez [1992...
We describe the effect of physical dissipation on stability of equilibria which have been stabilize...
Controlled Lagrangian and matching techniques are developed for the stabilization of relative equili...
The method of controlled Lagrangians for discrete mechanical systems is extended to include potenti...
This paper discusses the matching conditions resulting from the controlled Lagrangians method and th...
The so-called inverse problem of dynamics is about constructing a potential for a given family of cu...
The paper adresses the problem of stabilization of a specific target position of underactuated Lagra...
The method of controlled Lagrangians is a technique for stabilizing relative equilibria of mechanic...
Many interesting control systems are mechanical control systems. In spite of this, there has not bee...