We study the reduction by symmetry for optimality conditions in optimal control problems of left-invariant affine multi-agent control systems, with partial symmetry breaking cost functions for continuous-time and discrete-time systems. We recast the optimal control problem as a constrained variational problem with a partial symmetry breaking Lagrangian and obtain the reduced optimality conditions from a reduced variational principle via symmetry reduction techniques in both settings, continuous-time, and discrete-time. We apply the results to a collision and obstacle avoidance problem for multiple vehicles evolving on $SE(2)$ in the presence of a static obstacle.Comment: 20 page
This paper studies the optimal motion control of mechanical systems through a discrete geometric ap...
The aim of this thesis is to study a class of left-invariant optimal control problems on the matrix ...
Abstract. This paper develops numerical methods for optimal control of mechanical systems in the Lag...
In this thesis, we consider smooth optimal control systems that evolve on Lie groups. Pontryagin's m...
We address the problem of symmetry reduction of optimal control problems under the action of a finit...
: In this paper we present a simplified formulation of the necessary conditions for optimal controls...
Abstract. This paper explores the role of symmetries and reduction in nonlinear control and optimal ...
Abstract. We discuss the use of Dirac structures to obtain a better under-standing of the geometry o...
Abstract. For an invariant Lagrangian equal to kinetic energy and defined on a semidirect product of...
We consider the optimal control of mechanical systems on Lie groups and develop numerical methods th...
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...
The purpose of this thesis is to investigate a class of four left-invariant optimal control problems...
A new relation among a class of optimal control systems and Lagrangian systems with symmetry is disc...
Abstract — This paper proposes a computational method to solve constrained cooperative motion planni...
This paper studies the optimal motion control of mechanical systems through a discrete geometric ap...
The aim of this thesis is to study a class of left-invariant optimal control problems on the matrix ...
Abstract. This paper develops numerical methods for optimal control of mechanical systems in the Lag...
In this thesis, we consider smooth optimal control systems that evolve on Lie groups. Pontryagin's m...
We address the problem of symmetry reduction of optimal control problems under the action of a finit...
: In this paper we present a simplified formulation of the necessary conditions for optimal controls...
Abstract. This paper explores the role of symmetries and reduction in nonlinear control and optimal ...
Abstract. We discuss the use of Dirac structures to obtain a better under-standing of the geometry o...
Abstract. For an invariant Lagrangian equal to kinetic energy and defined on a semidirect product of...
We consider the optimal control of mechanical systems on Lie groups and develop numerical methods th...
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...
The purpose of this thesis is to investigate a class of four left-invariant optimal control problems...
A new relation among a class of optimal control systems and Lagrangian systems with symmetry is disc...
Abstract — This paper proposes a computational method to solve constrained cooperative motion planni...
This paper studies the optimal motion control of mechanical systems through a discrete geometric ap...
The aim of this thesis is to study a class of left-invariant optimal control problems on the matrix ...
Abstract. This paper develops numerical methods for optimal control of mechanical systems in the Lag...