Two generalizations on the minimum Hamming distance of repeated-root constacyclic codes
Abstract
We study constacyclic codes, of length nps and 2nps, that are generated by the polynomials (xn + γ) and (xn - )i(xn + )j\ respectively, where xn + γ, xn - and xn + are irreducible over the alphabet pa. We generalize the results of [5], [6] and [7] by computing the minimum Hamming distance of these codes. As a particular case, we determine the minimum Hamming distance of cyclic and negacyclic codes, of length 2ps, over a finite field of characteristic p.
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