Codes over the non-unital non-commutative ring E using simplicial complexes

Abstract

There are exactly two non-commutative rings of size 4, namely, E = a, b ~ ~ 2a = 2b = 0, a2 = a, b2 = b, ab= a, ba = b and its opposite ring F. These rings are non-unital. A subset D of Em is defined with the help of simplicial complexes, and utilized to construct linear left-E-codes CLD=\(v· d)d∈ D : v∈ Em\ and right-E-codes CRD=\(d· v)d∈ D : v∈ Em\. We study their corresponding binary codes obtained via a Gray map. The weight distributions of all these codes are computed. We achieve a couple of infinite families of optimal codes with respect to the Griesmer bound. Ashikhmin-Barg's condition for minimality of a linear code is satisfied by most of the binary codes we constructed here. All the binary codes in this article are few-weight codes, and self-orthogonal codes under certain mild conditions. This is the first attempt to study the structure of linear codes over non-unital non-commutative rings using simplicial complexes.