Linear quadratic control under quadratic constraints

Author

van der Geest, Robert ; Rantzer, Anders

Author_Institution

Fac. of Appl. Math., Univ. of Twente, Enschede, Netherlands

fYear

1997

fDate

1-7 July 1997

Firstpage

3363

Lastpage

3368

Abstract

The linear quadratic optimal control problem under quadratic constraints is an optimization problem over a generally non-convex set. Yakubovich [8] and Megretski [4] have studied this problem, and they show how it may be translated into a two-stage, convex optimization problem. In this paper we study the linear quadratic control problem under quadratic constraints for generalized first-order systems. As in the state-space case the linear quadratic control problem without quadratic constraints may be solved in terms of a linear matrix inequality. Subsequently, we use the results from [8] to derive a linear matrix inequality characterizing the linear quadratic optimal behaviour under quadratic constraints.

Keywords

concave programming; convex programming; linear matrix inequalities; linear quadratic control; state-space methods; convex optimization; generalized first-order system; linear matrix inequality; linear quadratic optimal control problem; nonconvex set; quadratic constraint; state-space case; Convex functions; Kernel; Linear matrix inequalities; Optimal control; Optimization; Polynomials; Symmetric matrices; linear matrix inequality (LMI); linear quadratic (LQ) optimal control; non-convex optimization;

fLanguage

English

Publisher

ieee

Conference_Titel

Control Conference (ECC), 1997 European

Conference_Location

Brussels

Print_ISBN

978-3-9524269-0-6

Type

conf

Filename

7082632