DocumentCode
892715
Title
Some new upper bounds on the covering radius of binary linear codes
Author
Janwa, Heeralal
Author_Institution
Courant Inst. of Math., New York Univ., NY, USA
Volume
35
Issue
1
fYear
1989
fDate
1/1/1989 12:00:00 AM
Firstpage
110
Lastpage
122
Abstract
A Griesmer-like upper bound on the covering radius, R , is given. To the author´s knowledge this is the only upper bound which explicitly depends on all three parameters n , k , and d . An upper bound on R for cyclic codes is then given which depends on the generator polynomial of the cyclic code and which, in many cases, leads to an improvement of the previous bound. An upper bound on the irreducible generator polynomial cyclic codes is also given. New interpretations and applications of the so-called Norse bounds and necessary and sufficient conditions to attain one of these bounds are provided. Generalizations of most of the results for codes over GF(q ) are outlined
Keywords
encoding; error correction codes; GF(q); Griesmer-like upper bound; Norse bounds; binary linear codes; covering radius; cyclic codes; generator polynomial; irreducible generator polynomial; upper bounds; Block codes; Galois fields; Helium; Information science; Linear code; Mathematics; Sufficient conditions; Upper bound; Vectors;
fLanguage
English
Journal_Title
Information Theory, IEEE Transactions on
Publisher
ieee
ISSN
0018-9448
Type
jour
DOI
10.1109/18.42182
Filename
42182
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