Title :
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
fDate :
3/1/1992 12:00:00 AM
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 Pe for a given code block length n from that of the code block length n-1. The proposed computation technique for determining Pe does not require knowledge of the code weight distributions. For a generator polynomial of degree r, and |g| nonzero coefficients, the technique yields Pe for all code block lengths up to length n in time complexity O(n|g |2r+|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;
Journal_Title :
Communications, IEEE Transactions on
