A projected SQP method for nonlinear optimal control with quadratic convergence

Author

Bayer, Florian A. ; Notarstefano, Giuseppe ; Allgower, F.

Author_Institution

Inst. for Syst. Theor. & Autom. Control, Univ. of Stuttgart, Stuttgart, Germany

fYear

2013

fDate

10-13 Dec. 2013

Firstpage

6463

Lastpage

6468

Abstract

In this paper, we propose a discrete-time Sequential Quadratic Programming (SQP) algorithm for nonlinear optimal control problems. Using the idea by Hauser of projecting curves onto the trajectory space, the introduced algorithm has guaranteed recursive feasibility of the dynamic constraints. The second essential feature of the algorithm is a specific choice of the Lagrange multiplier update. Due to this ad hoc choice of the multiplier, the algorithm converges locally quadratically. Finally, we show how the proposed algorithm connects standard SQP methods for nonlinear optimal control with the Projection Operator Newton method by Hauser.

Keywords

convergence; discrete time systems; nonlinear control systems; optimal control; quadratic programming; Lagrange multiplier; curve projection; discrete-time sequential quadratic programming algorithm; nonlinear optimal control; projected SQP method; projection operator Newton method; quadratic convergence; trajectory space; Convergence; Heuristic algorithms; Manifolds; Optimal control; Optimization; Standards; Trajectory;

fLanguage

English

Publisher

ieee

Conference_Titel

Decision and Control (CDC), 2013 IEEE 52nd Annual Conference on

Conference_Location

Firenze

ISSN

0743-1546

Print_ISBN

978-1-4673-5714-2

Type

conf

DOI

10.1109/CDC.2013.6760912

Filename

6760912