DocumentCode
105932
Title
On the Covering Radius of MDS Codes
Author
Bartoli, Daniele ; Giulietti, Massimo ; Platoni, Irene
Author_Institution
Dept. of Pure Math. & Comput. Algebra, Univ. of Ghent, Ghent, Belgium
Volume
61
Issue
2
fYear
2015
fDate
Feb. 2015
Firstpage
801
Lastpage
811
Abstract
For a linear maximum distance separable (MDS) code with redundancy r, the covering radius is either r or r -1. However, for r > 3, few examples of q-ary linear MDS codes with radius r -1 are known, including the Reed-Solomon codes with length q + 1. In this paper, for redundancies r as large as 12√q, infinite families of q-ary MDS codes with covering radius r - 1 and length less than q + 1 are constructed. These codes are obtained from algebraic-geometric codes arising from elliptic curves. For most pairs (r, q) with r ≤ 12√q, these are the shortest q-ary MDS codes with covering radius r - 1.
Keywords
Reed-Solomon codes; algebraic geometric codes; linear codes; RS codes; Reed-Solomon codes; algebraic-geometric codes; covering radius; elliptic curves; linear maximum distance separable codes; q-ary linear MDS codes; Electronic mail; Elliptic curves; Parity check codes; Redundancy; Reed-Solomon codes; AG codes; MDS codes; covering radius;
fLanguage
English
Journal_Title
Information Theory, IEEE Transactions on
Publisher
ieee
ISSN
0018-9448
Type
jour
DOI
10.1109/TIT.2014.2385084
Filename
6994850
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