On the observability properties of a class of 2D discrete linear systems

Author

Dymkov, M. ; Gaishun, I. ; Rogers, E. ; Galkowski, K. ; Owens, D.H.

Author_Institution

Inst. of Math., Acad. of Sci., Minsk, Belarus

Volume

4

fYear

2001

fDate

2001

Firstpage

3625

Abstract

Repetitive processes are a distinct class of 2D systems of both theoretical and applications interest. They arise, for example, in the modeling of industrial processes such as long-wall coal cutting and are the essential starting point for the study of classes of linear iterative learning control schemes. The development of a ´mature´ systems theory for these processes is the subject of the paper. In particular, a Volterra operator setting is used to produce the first significant results on an observability theory for so-called discrete linear repetitive processes which are of particular interest in a number of areas, e.g. the modeling and analysis of a wide class of linear iterative learning control schemes

Keywords

discrete systems; linear systems; matrix algebra; multidimensional systems; observability; series (mathematics); stability; 2D discrete linear systems; Volterra operator; discrete linear repetitive processes; industrial processes; linear iterative learning control schemes; longwall coal cutting; multidimensional systems; observability properties; Computer science; Electrical equipment industry; Heuristic algorithms; Industrial control; Iterative algorithms; Linear systems; Metals industry; Observability; Optimal control; Stability;

fLanguage

English

Publisher

ieee

Conference_Titel

Decision and Control, 2001. Proceedings of the 40th IEEE Conference on

Conference_Location

Orlando, FL

Print_ISBN

0-7803-7061-9

Type

conf

DOI

10.1109/.2001.980423

Filename

980423