Some ternary cubic two-weight codes

Abstract

We study trace codes with defining set L, a subgroup of the multiplicative group of an extension of degree m of the alphabet ring F3+uF3+u2F3, with u3=1. These codes are abelian, and their ternary images are quasi-cyclic of co-index three (a.k.a. cubic codes). Their Lee weight distributions are computed by using Gauss sums. These codes have three nonzero weights when m is singly-even and |L|=33m-32m2. When m is odd, and |L|=33m-32m2, or |L|=33m-32m and m is a positive integer, we obtain two new infinite families of two-weight codes which are optimal. Applications of the image codes to secret sharing schemes are also given.