Model predictive control for continuous piecewise affine systems using optimistic optimization

This paper considers model predictive control for continuous piecewise affine (PWA) systems. In general, this leads to a nonlinear, nonconvex optimization problem. We introduce an approach based on optimistic optimization to solve the resulting optimization problem. Optimistic optimization is based on recursive partitioning of the feasible set and is characterized by an efficient exploration strategy seeking for the optimal solution. The advantage of optimistic optimization is that one can guarantee bounds on the suboptimality with respect to the global optimum for a given computational budget. The 1-norm and ∞-norm objective functions often considered in model predictive control for continuous PWA systems are continuous PWA functions. We derive expressions for the core parameters required by optimistic optimization for the resulting optimization problem. By applying optimistic optimization, a sequence of control inputs is designed satisfying linear constraints. A bound on the suboptimality of the returned solution is also discussed. The performance of the proposed approach is illustrated with a case study on adaptive cruise control.

[1]  Rémi Munos,et al.  From Bandits to Monte-Carlo Tree Search: The Optimistic Principle Applied to Optimization and Planning , 2014, Found. Trends Mach. Learn..

[2]  Bart De Schutter,et al.  Model Predictive Control for Max-Plus-Linear Systems Via Optimistic Optimization , 2014, WODES.

[3]  Rémi Munos,et al.  Optimistic Optimization of Deterministic Functions , 2011, NIPS 2011.

[4]  S. Ovchinnikov Max-Min Representation of Piecewise Linear Functions , 2000, math/0009026.

[5]  G. Birkhoff,et al.  Piecewise affine functions and polyhedral sets , 1994 .

[6]  Alberto Bemporad,et al.  Control of systems integrating logic, dynamics, and constraints , 1999, Autom..

[7]  Eduardo Sontag Nonlinear regulation: The piecewise linear approach , 1981 .

[8]  Bart De Schutter,et al.  Optimistic optimization for continuous nonconvex piecewise affine functions , 2021, Autom..

[9]  Rémi Munos,et al.  Stochastic Simultaneous Optimistic Optimization , 2013, ICML.

[10]  O. Krötenheerdt Beiträge zur Algebra und Geometrie = Contributions to algebra and geometry , 1993 .

[11]  Bart De Schutter,et al.  Optimistic planning with a limited number of action switches for near-optimal nonlinear control , 2014, 53rd IEEE Conference on Decision and Control.

[12]  Lucian Busoniu,et al.  Consensus for black-box nonlinear agents using optimistic optimization , 2014, Autom..

[13]  Bart De Schutter,et al.  Robust hybrid MPC applied to the design of an adaptive cruise controller for a road vehicle , 2006, Proceedings of the 45th IEEE Conference on Decision and Control.

[14]  Romain Postoyan,et al.  Near-optimal strategies for nonlinear networked control systems using optimistic planning , 2013, 2013 American Control Conference.

[15]  Robert Babuska,et al.  A review of optimistic planning in Markov decision processes , 2013 .

[16]  Bart De Schutter,et al.  Equivalence of hybrid dynamical models , 2001, Autom..

[17]  Bart De Schutter,et al.  MPC for continuous piecewise-affine systems , 2004, Syst. Control. Lett..