A class of few-Lee weight Z2[u]-linear codes using simplicial complexes and minimal codes via Gray map

Abstract

Recently some mixed alphabet rings are involved in constructing few-Lee weight additive codes with optimal or minimal Gray images using suitable defining sets or down-sets. Inspired by these works, we choose the mixed alphabet ring Z2Z2[u] to construct a special class of linear code CL over Z2[u] with u2=0 by employing simplicial complexes generated by a single maximal element. We show that CL has few-Lee weights by determining the Lee weight distribution of CL. Theoretically, this shows that we may employ simplicial complexes to obatin few-weight codes even in the case of mixed alphabet rings. We show that the Gray image of CL is self-orthogonal and we have an infinite family of minimal codes over Z2 via Gray map, which can be used to secret sharing schemes.

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