On q-ary shortened-1-perfect-like codes

Abstract

We study codes with parameters of q-ary shortened Hamming codes, i.e., (n=(qm-q)/(q-1), qn-m, 3)q. Firstly, we prove the fact mentioned in 1998 by Brouwer et al. that such codes are optimal, generalizing it to a bound for multifold packings of radius-1 balls, with a corollary for multiple coverings. In particular, we show that the punctured Hamming code is an optimal q-fold packing with minimum distance 2. Secondly, for every admissible length starting from n=20, we show the existence of 4-ary codes with parameters of shortened 1-perfect codes that cannot be obtained by shortening a 1-perfect code. Keywords: Hamming graph, multifold packings, multiple coverings, perfect codes.

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