This paper discusses the matching conditions resulting from the controlled Lagrangians method and the interconnection and damping assignment passivity based control (IDA-PBC) method. Both methods have been presented recently in the literature as means to stabilize a desired equilibrium point of an Euler-Lagrange, respectively Hamiltonian, system. In the context of mechanical systems with symmetry, the original controlled Lagrangians method is reviewed, and an interpretation of the matching assumptions in terms of the matching of kinetic and potential energy is given. Secondly, both methods are applied to the general class of underactuated mechanical systems and it is shown that the controlled Lagrangians method is contained in the IDA-PBC m...
Energy shaping and passivity-based control designs have proven to be effective in solving control pr...
A dynamic extension for position feedback of port-Hamiltonian mechanical systems is studied. First w...
shaping, passivity. In this paper we consider the application of a new formulation of Passivity Base...
This paper discusses the matching conditions resulting from the controlled Lagrangians method and th...
This paper discusses the matching conditions as introduced in two recently developed methods for sta...
The purpose of this paper is to show that the method of controlled Lagrangians and its Hamiltonian ...
We develop a method to simplify the partial differential equations (PDEs) associated to the potentia...
We develop a method for the stabilization of mechanical systems with symmetry based on the technique...
We describe a class of mechanical systems for which the “method of controlled Lagrangians” provides ...
The Interconnection and Damping Assignment Passivity-Based Control (IDA-PBC) problem for port-contro...
This paper presents the control of a translational oscillator with a rotational actuator (TORA) syst...
This paper presents a passivity-based control strategy dealing with underactuated two-degree-of-free...
We extend the method of controlled Lagrangians to include potential shaping for complete state-space...
Energy shaping and passivity-based control designs have proven to be effective in solving control pr...
A dynamic extension for position feedback of port-Hamiltonian mechanical systems is studied. First w...
shaping, passivity. In this paper we consider the application of a new formulation of Passivity Base...
This paper discusses the matching conditions resulting from the controlled Lagrangians method and th...
This paper discusses the matching conditions as introduced in two recently developed methods for sta...
The purpose of this paper is to show that the method of controlled Lagrangians and its Hamiltonian ...
We develop a method to simplify the partial differential equations (PDEs) associated to the potentia...
We develop a method for the stabilization of mechanical systems with symmetry based on the technique...
We describe a class of mechanical systems for which the “method of controlled Lagrangians” provides ...
The Interconnection and Damping Assignment Passivity-Based Control (IDA-PBC) problem for port-contro...
This paper presents the control of a translational oscillator with a rotational actuator (TORA) syst...
This paper presents a passivity-based control strategy dealing with underactuated two-degree-of-free...
We extend the method of controlled Lagrangians to include potential shaping for complete state-space...
Energy shaping and passivity-based control designs have proven to be effective in solving control pr...
A dynamic extension for position feedback of port-Hamiltonian mechanical systems is studied. First w...
shaping, passivity. In this paper we consider the application of a new formulation of Passivity Base...