Computing the probability of undetected error for shortened cyclic codes

Author

Agarwal, Vinod K. ; Ivanov, André

Author_Institution

Dept. of Electr. Eng., McGill Univ., Montreal, Que., Canada

Volume

40

Issue

3

fYear

1992

fDate

3/1/1992 12:00:00 AM

Firstpage

494

Lastpage

499

Abstract

The authors present a general technique for computing P _e for all possible shortened versions of cyclic codes generated by any given polynomial. The technique is recursive, i.e. computes P_e for a given code block length n from that of the code block length n-1. The proposed computation technique for determining P_e does not require knowledge of the code weight distributions. For a generator polynomial of degree r, and |g| nonzero coefficients, the technique yields P_e for all code block lengths up to length n in time complexity O(n|g |2^r+|g|). Channels with variable bit error probabilities can be analyzed with the same complexity. This enables the performance of the code generator polynomials to be analyzed for burst errors

Keywords

error detection codes; probability; telecommunication channels; bit error probabilities; burst errors; channels; code block length; code generator polynomials; linear block codes; recursive method; shortened cyclic codes; time complexity; Block codes; Code standards; Data communication; Decoding; Distributed computing; Error analysis; Error probability; Linear code; Performance analysis; Upper bound;

fLanguage

English

Journal_Title

Communications, IEEE Transactions on

Publisher

ieee

ISSN

0090-6778

Type

jour

DOI

10.1109/26.135719

Filename

135719