New upper bounds for binary linear covering codes
Abstract
The length function 2(r,R) is the smallest length of a binary linear code with codimension (redundancy) r and covering radius R. We obtain the following new upper bounds on 2(r,R), which yield a decrease (r,R) compared to the best previously known upper bounds: equation* R=2,\,r=2t,\,r=18,20, and r28,\,2(r,2)26·2r/2-4-1;\,(r,2)=2r/2-4. equation* equation* R=3,\,r=3t-1,\,r=26 and r44,\,2(r,3)819·2(r-26)/3-1;\,(r,3)=2(r-23)/3. equation* equation* R=4,\,r=4t,\,r=40 and r68,\,2(r,4)2943·2r/4-10-1;\,(r,4)=2r/4-10-1. equation* To obtain these bounds we construct new infinite code families, using distinct versions of the qm-concatenating constructions of covering codes; some of these versions are proposed in this paper. We also introduce new useful partitions of column sets of parity check matrices of some codes. The asymptotic covering densities μ(2)1.3203, μ(3)1.3643, μ(4)2.8428, provided by the codes of the new families, are smaller than the known ones.
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