This paper studies the optimal motion control of mechanical systems through a discrete geometric approach. At the core of our formulation is a discrete Lagrange-d’Alembert- Pontryagin variational principle, from which are derived discrete equations of motion that serve as constraints in our optimization framework. We apply this discrete mechanical approach to holonomic systems with symmetries and, as a result, geometric structure and motion invariants are preserved. We illustrate our method by computing optimal trajectories for a simple model of an air vehicle flying through a digital terrain elevation map, and point out some of the numerical benefits that ensue
Matching techniques are developed for discrete mechanical systems with symmetry. We describe new ph...
Nonlinear control of mechanical systems is a challenging discipline that lies at the intersection be...
Abstract Trajectory optimization involves both the optimization of inputs and the feedback regulatio...
UnrestrictedThe goal of this work is to develop methods to optimally control autonomous robotic vehi...
The paper develops discretization schemes for mechanical systems for integration and optimization pu...
We consider the optimal control of mechanical systems on Lie groups and develop numerical methods th...
Abstract. This paper develops numerical methods for optimal control of mechanical systems in the Lag...
The equations of motion of a controlled mechanical system subject to holonomic constraints may be fo...
Abstract. In this paper we study a discrete variational optimal control prob-lem for the rigid body....
The optimal control of a mechanical system is of crucial importance in many application areas. Typic...
This paper presents a methodology for generating locally optimal control policies for mechanical sys...
In this paper we study discrete second-order vakonomic mechanics, that is, constrained variational p...
A mission design technique that combines invariant manifold techniques, discrete mechanics, and opti...
In this thesis we present practical tools and techniques to numerically solve optimal control proble...
Abstract. In this paper, we consider a geometric formalism for optimal control of under-actuated mec...
Matching techniques are developed for discrete mechanical systems with symmetry. We describe new ph...
Nonlinear control of mechanical systems is a challenging discipline that lies at the intersection be...
Abstract Trajectory optimization involves both the optimization of inputs and the feedback regulatio...
UnrestrictedThe goal of this work is to develop methods to optimally control autonomous robotic vehi...
The paper develops discretization schemes for mechanical systems for integration and optimization pu...
We consider the optimal control of mechanical systems on Lie groups and develop numerical methods th...
Abstract. This paper develops numerical methods for optimal control of mechanical systems in the Lag...
The equations of motion of a controlled mechanical system subject to holonomic constraints may be fo...
Abstract. In this paper we study a discrete variational optimal control prob-lem for the rigid body....
The optimal control of a mechanical system is of crucial importance in many application areas. Typic...
This paper presents a methodology for generating locally optimal control policies for mechanical sys...
In this paper we study discrete second-order vakonomic mechanics, that is, constrained variational p...
A mission design technique that combines invariant manifold techniques, discrete mechanics, and opti...
In this thesis we present practical tools and techniques to numerically solve optimal control proble...
Abstract. In this paper, we consider a geometric formalism for optimal control of under-actuated mec...
Matching techniques are developed for discrete mechanical systems with symmetry. We describe new ph...
Nonlinear control of mechanical systems is a challenging discipline that lies at the intersection be...
Abstract Trajectory optimization involves both the optimization of inputs and the feedback regulatio...