Dynamical systems and convolutional codes over finite Abelian groups

Author

Fagnani, Fabio ; Zampieri, Sandro

Author_Institution

Dipartimento di Elettronica e Inf., Padova Univ., Italy

Volume

42

Issue

6

fYear

1996

fDate

11/1/1996 12:00:00 AM

Firstpage

1892

Lastpage

1912

Abstract

Polynomial algebraic techniques have always played a central role in linear systems theory and also in the theory of convolutional codes. We show how such techniques can be generalized to study systems and codes defined over Abelian groups. The systems are considered from the “behavioral” point of view as developed by Willems in the 1980s, and some of our results can be seen as extensions of Willems´ results to group systems. We also address a certain number of coding-oriented questions, and we propose concrete methods based on these algebraic techniques for the synthesis of encoders, inverters, and syndrome formers for codes over finite Abelian groups

Keywords

convolutional codes; group theory; invertors; linear systems; polynomials; system theory; algebraic techniques; coding; convolutional codes; encoders; finite Abelian groups; group theory; inverters; linear systems theory; polynomial algebraic techniques; syndrome formers; systems behavior; Concrete; Control theory; Controllability; Convolutional codes; Difference equations; Helium; Inverters; Linear systems; Observability; Signal processing;

fLanguage

English

Journal_Title

Information Theory, IEEE Transactions on

Publisher

ieee

ISSN

0018-9448

Type

jour

DOI

10.1109/18.556683

Filename

556683