On constructing a shortest linear recurrence relation

Author

Kuijper, Margreet ; Willems, Jan C.

Author_Institution

Dept. of Electr. & Electron. Eng., Melbourne Univ., Parkville, Vic., Australia

Volume

3

fYear

1995

fDate

13-15 Dec 1995

Firstpage

3253

Abstract

In 1968, Berlekamp and Massey presented an algorithm to compute a shortest linear recurrence relation for a finite sequence of numbers. It was originally designed for the purpose of decoding certain types of block codes. It later became important for cryptographic applications, namely for determining the complexity profile of a sequence of numbers. Here, the authors interpret the Berlekamp-Massey algorithm in a system-theoretic way. The authors explicitly present the algorithm as an iterative procedure to construct a behavior. The authors conclude that this procedure is the most efficient method for solving the scalar minimal partial realization problem

Keywords

iterative methods; polynomials; realisation theory; sequences; block codes; complexity profile; cryptographic applications; decoding; iterative procedure; scalar minimal partial realization problem; shortest linear recurrence relation; system-theoretic interpretation; Block codes; Character generation; Cryptography; Ear; Information theory; Iterative algorithms; Iterative decoding; Mathematics; Maximum likelihood decoding; Polynomials;

fLanguage

English

Publisher

ieee

Conference_Titel

Decision and Control, 1995., Proceedings of the 34th IEEE Conference on

Conference_Location

New Orleans, LA

ISSN

0191-2216

Print_ISBN

0-7803-2685-7

Type

conf

DOI

10.1109/CDC.1995.478652

Filename

478652