On the equivalence of NMDS codes
Abstract
An [n,k,d] linear code is said to be maximum distance separable (MDS) or almost maximum distance separable (AMDS) if d=n-k+1 or d=n-k, respectively. If a code and its dual code are both AMDS, then the code is said to be near maximum distance separable (NMDS). For k=3 and k=4, there are many constructions of NMDS codes by adding some suitable projective points to arcs in PG(k-1,q). In this paper, we consider the monomial equivalence problem for some NMDS codes with the same weight distributions and present new constructions of NMDS codes.
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