Subfield Codes of Several Few-Weight Linear Codes Parametrized by Functions and Their Consequences
Abstract
Subfield codes of linear codes over finite fields have recently received much attention. Some of these codes are optimal and have applications in secrete sharing, authentication codes and association schemes. In this paper, the q-ary subfield codes Cf,g(q) of six different families of linear codes Cf,g parametrized by two functions f, g over a finite field Fqm are considered and studied, respectively. The parameters and (Hamming) weight distribution of Cf,g(q) and their punctured codes Cf,g(q) are explicitly determined. The parameters of the duals of these codes are also analyzed. Some of the resultant q-ary codes Cf,g(q), Cf,g(q) and their dual codes are optimal and some have the best known parameters. The parameters and weight enumerators of the first two families of linear codes Cf,g are also settled, among which the first family is an optimal two-weight linear code meeting the Griesmer bound, and the dual codes of these two families are almost MDS codes. As a byproduct of this paper, a family of [24m-2,2m+1,24m-3] quaternary Hermitian self-dual code are obtained with m ≥ 2. As an application, we show that three families of the derived linear codes give rise to several infinite families of t-designs (t ∈ \2, 3\).
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