Subfield codes of CD-codes over F2[x]/ x3-x are really nice!

Abstract

A non-zero F-linear map from a finite-dimensional commutative F-algebra to F is called an F-valued trace if its kernel does not contain any non-zero ideals. In this article, we utilize an F2-valued trace of the F2-algebra R2:=F2[x]/ x3-x to study binary subfield code CD(2) of CD:=\(x· d)d∈ D: x∈ R2m\ for each defining set D derived from a certain simplicial complex. For m∈ N and X⊂eq \1, 2, …, m\, define X:=\v∈ F2m: (v)⊂eq X\ and D:=(1+u2)D1+u2D2+(u+u2)D3, a subset of R2m, where u=x+ x3-x, D1∈ \L, Lc\,\, D2∈ \M, Mc\ and D3∈ \N, Nc\, for L, M, N⊂eq \1, 2, …, m\. The parameters and the Hamming weight distribution of the binary subfield code CD(2) of CD are determined for each D. These binary subfield codes are minimal under certain mild conditions on the cardinalities of L, M and N. Moreover, most of these codes are distance-optimal. Consequently, we obtain a few infinite families of minimal, self-orthogonal and distance-optimal binary linear codes that are either 2-weight or 4-weight. It is worth mentioning that we have obtained several new distance-optimal binary linear codes.