An algorithm to solve algebraic Riccati equations with polynomials

Author

Augusta, Petr

Author_Institution

Inst. of Inf. Theor. & Autom., Prague, Czech Republic

fYear

2012

fDate

27-30 Aug. 2012

Firstpage

409

Lastpage

414

Abstract

The paper deals with solving algebraic Riccati equations with two-sided polynomials, which arise in some applications of optimal control of linear time-invariant spatially distributed systems. The conditions are given for the existence of a solution in the set of finite-order polynomials. If such a solution does not exist, the infinite-order solution is truncated and given in the form of polynomial of an arbitrary high order. The proposed numerical algorithm is based on the discrete Fourier transform theory. An example on optimal control of spatially-distributed systems is also given. The proposed algorithm is used to design of the distributed LQ controller.

Keywords

Riccati equations; control system synthesis; discrete Fourier transforms; distributed control; linear quadratic control; polynomials; algebraic Riccati equation; arbitrary high order; discrete Fourier transform theory; distributed LQ controller design; finite-order polynomial; infinite-order solution; linear time-invariant spatially distributed system; numerical algorithm; optimal control; spatially-distributed system; two-sided polynomial; Algorithm design and analysis; Discrete Fourier transforms; Heating; Polynomials; Riccati equations; Signal processing algorithms;

fLanguage

English

Publisher

ieee

Conference_Titel

Methods and Models in Automation and Robotics (MMAR), 2012 17th International Conference on

Conference_Location

Miedzyzdrojie

Print_ISBN

978-1-4673-2121-1

Type

conf

DOI

10.1109/MMAR.2012.6347854

Filename

6347854