Title :
Classification of error locator polynomials for double error correcting BCH codes
Author :
Crepeau, Paul J.
Author_Institution :
Div. of Inf. Technol., Naval Res. Lab., Washington, DC, USA
fDate :
8/1/1998 12:00:00 AM
Abstract :
We give a complete classification of the error locator polynomials that occur in the Berlekamp decoding of double error correcting (DEC) Bose-Chaudhuri-Hocquenghem (BCH) codes. We present a new construction showing that all quadratic error locator polynomials produced by received vectors falling in the interstitial region between decoding spheres are illegitimate and have no roots. Furthermore, we show that a small subset of received vectors in the interstitial region produce cubic error locator polynomials that are illegitimate except for the correctable case of a triple error pattern with three equally spaced errors in the cyclic sense
Keywords :
BCH codes; coding errors; decoding; error correction codes; polynomials; Berlekamp decoding; Bose-Chaudhuri-Hocquenghem codes; cubic error locator polynomials; decoding spheres; double error correcting BCH codes; equally spaced errors; illegitimate error locator polynomials; interstitial region; quadratic error locator polynomials; received vectors; triple error pattern; Code standards; Communications Society; Computer errors; Decoding; Error correction; Error correction codes; Galois fields; Information technology; Military communication; Polynomials;
Journal_Title :
Communications, IEEE Transactions on
