In this paper we establish necessary conditions for optimal control using the ideas of Lagrangian reduction in the sense of reduction under a symmetry group. The techniques developed here are designed for Lagrangian mechanical control systems with symmetry. The benefit of such an approach is that it makes use of the special structure of the system, especially its symmetry structure and thus it leads rather directly to the desired conclusions for such systems. Lagrangian reduction can do in one step what one can alternatively do by applying the Pontryagin Maximum Principle followed by an application of Poisson reduction. The idea of using Lagrangian reduction in the sense of symmetry reduction was also obtained by Bloch and Crouch [19...
In this thesis, we consider smooth optimal control systems that evolve on Lie groups. Pontryagin's m...
Abstract In this paper, we describe a constrained Lagrangian and Hamiltonian formalism for the optim...
Abstract. We develop reduction theory for controlled Lagrangian and controlled Hamiltonian systems w...
In this paper we establish necessary conditions for optimal control using the ideas of Lagrangian re...
In this paper we establish necessary conditions for optimal control using the ideas of Lagrangian re...
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 important problems in multibody dynamics, the dynamics of wheeled vehicles and motion generatio...
This paper surveys selected recent progress in geometric mechanics, focussing on Lagrangian reductio...
This work develops the geometry and dynamics of mechanical systems with nonholonomic constraints and...
This paper continues the work of Koon and Marsden [1997b] that began the comparison of the Hamilton...
This paper compares the Hamiltonian approach to systems with nonholonomic constraints (see Weber [1...
We develop a method for the stabilization of mechanical systems with symmetry based on the technique...
This paper compares the Hamiltonian approach to systems with nonholonomic constraints (see Weber [19...
A new relation among a class of optimal control systems and Lagrangian systems with symmetry is disc...
In this thesis, we consider smooth optimal control systems that evolve on Lie groups. Pontryagin's m...
Abstract In this paper, we describe a constrained Lagrangian and Hamiltonian formalism for the optim...
Abstract. We develop reduction theory for controlled Lagrangian and controlled Hamiltonian systems w...
In this paper we establish necessary conditions for optimal control using the ideas of Lagrangian re...
In this paper we establish necessary conditions for optimal control using the ideas of Lagrangian re...
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 important problems in multibody dynamics, the dynamics of wheeled vehicles and motion generatio...
This paper surveys selected recent progress in geometric mechanics, focussing on Lagrangian reductio...
This work develops the geometry and dynamics of mechanical systems with nonholonomic constraints and...
This paper continues the work of Koon and Marsden [1997b] that began the comparison of the Hamilton...
This paper compares the Hamiltonian approach to systems with nonholonomic constraints (see Weber [1...
We develop a method for the stabilization of mechanical systems with symmetry based on the technique...
This paper compares the Hamiltonian approach to systems with nonholonomic constraints (see Weber [19...
A new relation among a class of optimal control systems and Lagrangian systems with symmetry is disc...
In this thesis, we consider smooth optimal control systems that evolve on Lie groups. Pontryagin's m...
Abstract In this paper, we describe a constrained Lagrangian and Hamiltonian formalism for the optim...
Abstract. We develop reduction theory for controlled Lagrangian and controlled Hamiltonian systems w...