DocumentCode
639869
Title
Generalizing bounds on the minimum distance of cyclic codes using cyclic product codes
Author
Zeh, Alexander ; Wachter-Zeh, Antonia ; Gadouleau, Maximilien ; Bezzateev, Sergey
Author_Institution
Inst. of Commun. Eng., Ulm Univ., Ulm, Germany
fYear
2013
fDate
7-12 July 2013
Firstpage
126
Lastpage
130
Abstract
Two generalizations of the Hartmann-Tzeng (HT) bound on the minimum distance of q-ary cyclic codes are proposed. The first one is proven by embedding the given cyclic code into a cyclic product code. Furthermore, we show that unique decoding up to this bound is always possible and outline a quadratic-time syndrome-based error decoding algorithm. The second bound is stronger and the proof is more involved. Our technique of embedding the code into a cyclic product code can be applied to other bounds, too and therefore generalizes them.
Keywords
cyclic codes; decoding; product codes; HT bound; Hartmann-Tzeng bound; cyclic product codes; minimum distance; q-ary cyclic codes; quadratic-time syndrome-based error decoding algorithm; Decoding; Generators; Matrix decomposition; Polynomials; Product codes; Bound on the Minimum Distance; Cyclic Code; Cyclic Product Code; Efficient Decoding;
fLanguage
English
Publisher
ieee
Conference_Titel
Information Theory Proceedings (ISIT), 2013 IEEE International Symposium on
Conference_Location
Istanbul
ISSN
2157-8095
Type
conf
DOI
10.1109/ISIT.2013.6620201
Filename
6620201
Link To Document