Abstract
AbstractThis paper investigates the role of hidden dynamics in influencing the stability of sliding solutions within control-switched systems. By employing cell-mapping methods, we provide numerical evidence that incorporating hidden dynamics on the switching manifold can extend the sliding dynamics, resulting in a significant expansion of the system’s region of attraction. As representative examples, we considered control systems with stable and unstable dynamics converging around multiple equilibrium points.
Funder
Antonio Narino University
Publisher
Springer Science and Business Media LLC