English

Aubry set for sub-Riemannian control systems

Optimization and Control 2022-04-28 v1 Analysis of PDEs

Abstract

In the paper [P. Cannarsa, C. Mendico, Asymptotic analysis for Hamilton-Jacobi- Bellman equations on Euclidean space, (2021) Arxiv], we proved the existence of the limit as the time horizon goes to infinity of the averaged value function of an optimal control problem. For the classical Tonelli case such a limit is called the critical constant of the problem. In the special case of sub-Riemannian control systems, we also proved the existence of a critical solution, that is, a continuous solution to the Hamilton-Jacobi equation associated with such a constant, which also coincides with its Lax-Oleinik evolution. Here, we focus our attention on the sub- Riemannian case providing a variational representation formula for the critical constant which uses an adapted notion of closed measures. Having such a formula at our disposal, we define and study the Aubry set. First, we investigate dynamical and topological properties of such a set w.r.t. a suitable class of minimizing trajectories of the Lagrangian action. Then, we show that critical solutions to the Hamilton-Jacobi equation are horizontally differentiable and satisfy the equation in classical sense on the Aubry set.

Keywords

Cite

@article{arxiv.2204.12544,
  title  = {Aubry set for sub-Riemannian control systems},
  author = {Piermarco Cannarsa and Cristian Mendico},
  journal= {arXiv preprint arXiv:2204.12544},
  year   = {2022}
}
R2 v1 2026-06-24T10:59:30.420Z