Solving Riccati differential equations with multilayer neural networks

Author

He, Shouling ; Reif, Konrad ; Unbehauen, Rolf

Author_Institution

Dept. of Electr. Eng., Erlangen-Nurnberg Univ., Germany

Volume

3

fYear

1997

fDate

10-12 Dec 1997

Firstpage

2199

Abstract

The tangential linearisation along the solution curve in a state space has been proposed for solving the feedback stabilisation of a nonlinear system. With the technique a nonlinear control problem can be transferred into a linear time-varying one. However, the Riccati differential equation for the optimal control of the linearised system is not only time dependent, but also the state and input-signal dependent. Therefore, one can not obtain the solution with a general method. In this paper we propose to train multilayer neural networks to get an approximate solution for the Riccati differential equation. An example shows that this method can lead to a good result

Keywords

Riccati equations; control system analysis computing; differential equations; feedforward neural nets; function approximation; linearisation techniques; nonlinear dynamical systems; Riccati differential equation; feedback stabilisation; function approximation; multilayer neural networks; nonlinear dynamical system; optimal control; state space; tangential linearisation; Differential equations; Multi-layer neural network; Neural networks; Neurofeedback; Nonhomogeneous media; Nonlinear systems; Optimal control; Riccati equations; State feedback; State-space methods;

fLanguage

English

Publisher

ieee

Conference_Titel

Decision and Control, 1997., Proceedings of the 36th IEEE Conference on

Conference_Location

San Diego, CA

ISSN

0191-2216

Print_ISBN

0-7803-4187-2

Type

conf

DOI

10.1109/CDC.1997.657093

Filename

657093