Optimal three-weight cubic codes
Abstract
In this paper, we construct an infinite family of three-weight binary codes from linear codes over the ring R=F2+vF2+v2F2, where v3=1. These codes are defined as trace codes. They have the algebraic structure of abelian codes. Their Lee weight distributions are computed by employing character sums. The three-weight binary linear codes which we construct are shown to be optimal when m is odd and m>1. They are cubic, that is to say quasi-cyclic of co-index three. An application to secret sharing schemes is given.
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