DocumentCode
3243600
Title
Some Results on the Binary Minimum Distance of Reed-Solomon Codes and Block Turbo Codes
Author
Le Bidan, Raphael ; Pyndiah, Ramesh ; Adde, P.
Author_Institution
ENST Bretagne, Brest
fYear
2007
fDate
24-28 June 2007
Firstpage
990
Lastpage
994
Abstract
We study the minimum distance of the binary expansion of high-rate Reed-Solomon (RS) codes and product codes in the polynomial basis and show that the binary codes obtained in this way usually have minimum distance equal to the designed symbol minimum distance. We then show that a judicious choice for the code roots may yield binary expansions with larger binary minimum distance and better asymptotic performance. This result is used to design high-rate RS product codes with significantly lower error floors compared to classical constructions.
Keywords
Reed-Solomon codes; block codes; product codes; turbo codes; Reed-Solomon codes; binary minimum distance; block turbo codes; product codes; symbol minimum distance; AWGN; Application software; Communications Society; Computational modeling; Maximum likelihood decoding; Product codes; Product design; Reed-Solomon codes; Terminology; Turbo codes;
fLanguage
English
Publisher
ieee
Conference_Titel
Communications, 2007. ICC '07. IEEE International Conference on
Conference_Location
Glasgow
Print_ISBN
1-4244-0353-7
Type
conf
DOI
10.1109/ICC.2007.168
Filename
4288839
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