Infinite families of MDS and almost MDS codes from BCH codes
Abstract
In this paper, the sufficient and necessary condition for the minimum distance of the BCH codes over Fq with length q+1 and designed distance 3 to be 3 and 4 are provided. Let d be the minimum distance of the BCH code C(q,q+1,3,h). We prove that (1) for any q, d=3 if and only if (2h+1,q+1)>1; (2) for q odd, d=4 if and only if (2h+1,q+1)=1. By combining these conditions with the dimensions of these codes, the parameters of this BCH code are determined completely when q is odd. Moreover, several infinite families of MDS and almost MDS (AMDS) codes are shown. Furthermore, the sufficient conditions for these AMDS codes to be distance-optimal and dimension-optimal locally repairable codes are presented. Based on these conditions, several examples are also given.
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