Robust optimal control of linear discrete-time systems using primal-dual interior-point methods

Author

Hansson, Anders ; Boyd, Stephen

Author_Institution

Inf. Syst. Lab., Stanford Univ., CA, USA

Volume

1

fYear

1998

fDate

21-26 Jun 1998

Firstpage

183

Abstract

This paper describes how to efficiently solve a robust optimal control problem using recently developed primal-dual interior-point methods. Among potential applications are model predictive control. The optimization problem considered consists of a worst case quadratic performance criterion over a finite set of linear discrete-time models subject to inequality constraints on the states and control signals. The scheme has been prototyped in Matlab. To give a rough idea of the efficiency obtained, it is possible to solve problems with more than 1000 variables and 5000 constraints in a few minutes on a workstation

Keywords

discrete time systems; linear systems; optimal control; optimisation; predictive control; robust control; discrete-time systems; inequality constraints; linear systems; model predictive control; optimal control; optimization; primal-dual interior-point; robust control; worst case quadratic performance criterion; Constraint optimization; Information systems; Laboratories; Mathematical model; Optimal control; Predictive control; Predictive models; Riccati equations; Robust control; Robustness;

fLanguage

English

Publisher

ieee

Conference_Titel

American Control Conference, 1998. Proceedings of the 1998

Conference_Location

Philadelphia, PA

ISSN

0743-1619

Print_ISBN

0-7803-4530-4

Type

conf

DOI

10.1109/ACC.1998.694654

Filename

694654