Doctoral School Mathematics and Scientific Computing

Abstract: The receding horizon framework is an efficient approach for dealing with optimal control problems. In this approach, an infinite horizon optimal control problem is approximated by a sequence of finite horizon problems in a receding horizon fashion. However, stability (convergence to a steady state) is not generally ensured due to the use of a finite prediction horizon. Thus, a terminal cost function and or terminal constraints are often needed to ensure asymptotic stability. In this presentation, we are concerned with the stabilization of the systems governed by partial differential equations. A new receding horizon control (RHC) schemes will be introduced. In this scheme, no terminal cost and terminal constrained are used to ensured the stability. Based on this stabilizability assumption of the system under investigation, the suboptimality and stability of this RHC will be investigated. At the end, we show some numerical results for Burgers' and Korteweg-de-Vries (KdV) equations. [hide abstract]