On the span reachability of polynomial state-affine systems

Author

Nomura, Toshio ; Furuta, Katsuhisa

Author_Institution

Tokyo Institute of Technology, Tokyo, Japan

Volume

Issue

fYear

1979

fDate

8/1/1979 12:00:00 AM

Firstpage

630

Lastpage

632

Abstract

The purpose of this report is to derive an explicit condition for the span reachability of a discrete polynomial state-affine system described by $x(k+1)=(A_{0} +\\Sigma \\min{i=1}\\max {r}u^{i}(k)A_{i})x(k)+ \\sum \\min{i=1}\\max {r} u^{i}(k)B_{i}, (k=0,1,...)$ (1) where $r$ is a positive integer, $x \\in R^{n}, u \\in R^{1},u^{i}$ denotes the ith power of $u$ , and Aiand Biare matrices of appropriate dimensions. In order to define input sequences which can construct reachable state vectors from the origin to span the whole state space, a generalized type of the Vandermonde\´s matrix is newly defined and utilized fully. Although the algebraic structure of (1) is more complicated than discrete bilinear systems, the result turns out to be quite analogous to each other.

Keywords

Bilinear systems, discrete-time; Discrete-time systems; Polynomials; Control engineering; Controllability; Erbium; Linear systems; Nonlinear systems; Observability; Polynomials; State-space methods; Vectors;

fLanguage

English

Journal_Title

Automatic Control, IEEE Transactions on

Publisher

ieee

ISSN

0018-9286

Type

jour

DOI

10.1109/TAC.1979.1102099

Filename

1102099

Link To Document

https://search.isc.ac/dl/search/defaultta.aspx?DTC=49&DC=830036