We address the problem of symmetry reduction of optimal control problems under the action of a finite group from a measure relaxation viewpoint. We propose a method based on the moment-SOS aka Lasserre hierarchy which allows one to significantly reduce the computation time and memory requirements compared to the case without symmetry reduction. We show that the recovery of optimal trajectories boils down to solving a symmetric parametric polynomial system. Then we illustrate our method on the symmetric integrator and the time-optimal inversion of qubits.Comment: 38 pages, 23 figure
AbstractThis paper provides a new simple version of Noether's theorem. From symmetries of dynamic op...
AbstractMuch of the literature on symmetry reductions for model checking assumes a simple model of c...
Abstract. We discuss the use of Dirac structures to obtain a better under-standing of the geometry o...
We address the problem of symmetry reduction of optimal control problems under the action of a finit...
In this thesis, we consider smooth optimal control systems that evolve on Lie groups. Pontryagin's m...
Abstract. This paper explores the role of symmetries and reduction in nonlinear control and optimal ...
We study the reduction by symmetry for optimality conditions in optimal control problems of left-inv...
It is argued that the existence of symmetries may simplify, as in classical mechanics, the solution ...
International audience— We present a method of exploiting symmetries of discrete-time optimal contro...
The arithmetic mean/geometric mean inequality (AM/GM inequality) facilitates classes of nonnegativit...
International audienceWe present a method of exploiting symmetries of discrete-time optimal control ...
The arithmetic mean/geometric mean-inequality (AM/GM-inequality) facilitates classes of non-negativi...
We discuss the use of symmetries in solving optimal control problems. In particular a procedure for ...
This dissertation develops the theory of symmetry for constrained linear systems. We use symmetry to...
Symmetry plays an important role in optimization. The usual approach to cope with symmetry in discr...
AbstractThis paper provides a new simple version of Noether's theorem. From symmetries of dynamic op...
AbstractMuch of the literature on symmetry reductions for model checking assumes a simple model of c...
Abstract. We discuss the use of Dirac structures to obtain a better under-standing of the geometry o...
We address the problem of symmetry reduction of optimal control problems under the action of a finit...
In this thesis, we consider smooth optimal control systems that evolve on Lie groups. Pontryagin's m...
Abstract. This paper explores the role of symmetries and reduction in nonlinear control and optimal ...
We study the reduction by symmetry for optimality conditions in optimal control problems of left-inv...
It is argued that the existence of symmetries may simplify, as in classical mechanics, the solution ...
International audience— We present a method of exploiting symmetries of discrete-time optimal contro...
The arithmetic mean/geometric mean inequality (AM/GM inequality) facilitates classes of nonnegativit...
International audienceWe present a method of exploiting symmetries of discrete-time optimal control ...
The arithmetic mean/geometric mean-inequality (AM/GM-inequality) facilitates classes of non-negativi...
We discuss the use of symmetries in solving optimal control problems. In particular a procedure for ...
This dissertation develops the theory of symmetry for constrained linear systems. We use symmetry to...
Symmetry plays an important role in optimization. The usual approach to cope with symmetry in discr...
AbstractThis paper provides a new simple version of Noether's theorem. From symmetries of dynamic op...
AbstractMuch of the literature on symmetry reductions for model checking assumes a simple model of c...
Abstract. We discuss the use of Dirac structures to obtain a better under-standing of the geometry o...