DocumentCode
946999
Title
A new upper bound for error-correcting codes
Author
Johnson, Selmer M.
Volume
8
Issue
3
fYear
1962
fDate
4/1/1962 12:00:00 AM
Firstpage
203
Lastpage
207
Abstract
By refining Hamming\´s geometric sphere-packing model a new upper bound for nonsystematic binary error-correcting codes is found. Only combinatorial arguments are used. Whereas Hamming\´s upper bound estimate for 
-error-correcting codes involved a count of all points 
Hamming distance from the set of code points, the model is extended here to include consideration of points which are 
distance away from the code set. The percentage improvement from Hamming\´s bounds is sometimes quite sizable for cases of two or more errors to be corrected. The new bound improves on Wax\´s bounds in all but four of the cases he lists.
-error-correcting codes involved a count of all points Hamming distance from the set of code points, the model is extended here to include consideration of points which are distance away from the code set. The percentage improvement from Hamming\´s bounds is sometimes quite sizable for cases of two or more errors to be corrected. The new bound improves on Wax\´s bounds in all but four of the cases he lists.Keywords
Error-correcting codes; Binary codes; Code standards; Density functional theory; Error correction; Error correction codes; Hamming distance; Information theory; Size measurement; Solid modeling; Upper bound;
fLanguage
English
Journal_Title
Information Theory, IRE Transactions on
Publisher
ieee
ISSN
0096-1000
Type
jour
DOI
10.1109/TIT.1962.1057714
Filename
1057714
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