Abstract
Let F be a finite field and b be a positive integer. A construction is presented of codes over the alphabet F/sup b/ with the following three properties: i) the codes are maximum-distance separable (MDS) over F/sup b/, ii) they are linear over F, and iii) they have systematic generator and parity-check matrices over F with the smallest possible number of nonzero entries. Furthermore, for the case F=GF(2), the construction is the longest possible among all codes that satisfy properties i)-iii).
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