{"ID":2848844,"CreatedAt":"2026-06-01T04:54:23.091178241Z","UpdatedAt":"2026-06-01T04:54:23.091178241Z","DeletedAt":null,"paper_url":"https://arxiv.org/abs/2510.23973","arxiv_id":"2510.23973","title":"Dynamics of linear control systems and stabilization","abstract":"In this paper, we study linear control systems with positive bounded orbits. We show that the existence of positive bounded orbits imposes strong algebraic and topological constraints on the state space. In fact, a linear control system has bounded positive orbits if and only if it can be decomposed as the product of the stable and central subgroups of the drift, with the central subgroup being compact. In particular, systems with bounded positive orbits admit a compact control set, and if the system is controllable, the entire state space is a compact group. As a byproduct, we obtain a complete characterization of the internal and BIBO stability of linear control systems.","short_abstract":"In this paper, we study linear control systems with positive bounded orbits. We show that the existence of positive bounded orbits imposes strong algebraic and topological constraints on the state space. In fact, a linear control system has bounded positive orbits if and only if it can be decomposed as the product of t...","url_abs":"https://arxiv.org/abs/2510.23973","url_pdf":"https://arxiv.org/pdf/2510.23973v1","authors":"[\"Victor Ayala\",\"Adriano Da Silva\"]","published":"2025-10-28T01:09:57Z","proceeding":"math.OC","tasks":"[\"math.OC\"]","methods":"[]","has_code":false}