Many interesting control systems are mechanical control systems. In spite of this, there has not been much effort to develop methods which use the special structure of mechanical systems to obtain analysis tools which are suitable for these systems. In this dissertation we take the first steps towards a methodical treatment of mechanical control systems. First we develop a framework for analysis of certain classes of mechanical control systems. In the Lagrangian formulation we study "simple mechanical control systems" whose Lagrangian is "kinetic energy minus potential energy." We propose a new and useful definition of controllability for these systems and obtain a computable set of conditions for this new version of controllability. We a...
A notion of controlled invariance is developed which is suited to Hamiltonian control systems. This ...
This dissertation is concerned with dynamic modeling and kinematic control of constrained mechanical...
We develop reduction theory for controlled Lagrangian and controlled Hamiltonian systems with symmet...
Many interesting control systems are mechanical control systems. In spite of this, there has not bee...
Many interesting control systems are mechanical control systems. In spite of this, there has not bee...
The purpose of this paper is to show that the method of controlled Lagrangians and its Hamiltonian ...
The work presented in this talk was initiated by some work which went into my PhD disserta-tion [Lew...
The primary emphasis of this book is the modeling, analysis, and control of mechanical systems. The ...
In this paper we present a definition of "configuration controllability" for mechanical systems who...
We develop a method for the stabilization of mechanical systems with symmetry based on the technique...
Nonlinear control of mechanical systems is a challenging discipline that lies at the intersection be...
We extend the method of controlled Lagrangians to include potential shaping for complete state-space...
For pt.I, see ibid., vol.45, p.2253-70 (2000). We extend the method of controlled Lagrangians (CL) t...
This paper compares the Hamiltonian approach to systems with nonholonomic constraints (see Weber [1...
none3New technologies have created engineering problems where successful controller designs must acc...
A notion of controlled invariance is developed which is suited to Hamiltonian control systems. This ...
This dissertation is concerned with dynamic modeling and kinematic control of constrained mechanical...
We develop reduction theory for controlled Lagrangian and controlled Hamiltonian systems with symmet...
Many interesting control systems are mechanical control systems. In spite of this, there has not bee...
Many interesting control systems are mechanical control systems. In spite of this, there has not bee...
The purpose of this paper is to show that the method of controlled Lagrangians and its Hamiltonian ...
The work presented in this talk was initiated by some work which went into my PhD disserta-tion [Lew...
The primary emphasis of this book is the modeling, analysis, and control of mechanical systems. The ...
In this paper we present a definition of "configuration controllability" for mechanical systems who...
We develop a method for the stabilization of mechanical systems with symmetry based on the technique...
Nonlinear control of mechanical systems is a challenging discipline that lies at the intersection be...
We extend the method of controlled Lagrangians to include potential shaping for complete state-space...
For pt.I, see ibid., vol.45, p.2253-70 (2000). We extend the method of controlled Lagrangians (CL) t...
This paper compares the Hamiltonian approach to systems with nonholonomic constraints (see Weber [1...
none3New technologies have created engineering problems where successful controller designs must acc...
A notion of controlled invariance is developed which is suited to Hamiltonian control systems. This ...
This dissertation is concerned with dynamic modeling and kinematic control of constrained mechanical...
We develop reduction theory for controlled Lagrangian and controlled Hamiltonian systems with symmet...