Perfect mixed codes from generalized Reed-Muller codes

Abstract

In this paper, we propose a new method for constructing 1-perfect mixed codes in the Cartesian product Fn × Fqn, where Fn and Fq are finite fields of orders n = qm and q. We consider generalized Reed-Muller codes of length n = qm and order (q - 1)m - 2. Codes whose parameters are the same as the parameters of generalized Reed-Muller codes are called Reed-Muller-like codes. The construction we propose is based on partitions of distance-2 MDS codes into Reed-Muller-like codes of order (q - 1)m - 2. We construct a set of qqcn nonequivalent 1-perfect mixed codes in the Cartesian product Fn × Fqn, where the constant c satisfies c < 1, n = qm and m is a sufficiently large positive integer. We also prove that each 1-perfect mixed code in the Cartesian product Fn × Fqn corresponds to a certain partition of a distance-2 MDS code into Reed-Muller-like codes of order (q - 1)m - 2.

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