Self-dual codes over the integers modulo 4
Journal of Combinatorial Theory Series A
On Spin Models, Modular Invariance, and Duality
Journal of Algebraic Combinatorics: An International Journal
All Z4 codes of type II and length 16 are known
Journal of Combinatorial Theory Series A
Applications of coding theory to the construction of modular lattices
Journal of Combinatorial Theory Series A
Duality Maps of Finite Abelian Groups and Their Applications to Spin Models
Journal of Algebraic Combinatorics: An International Journal
Mass formulas for self-dual codes over Z4 and Fq+uFq rings
IEEE Transactions on Information Theory
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We consider here the construction of Type II codes over the abelian group Z4×Z4. The definition of Type II codes here is based on the definitions introduced by Bannai [2]. The emphasis is given on the construction of these types of codes over the abelian group Z4×Z4 and in particular, the methods applied by Gaborit [7] in the construction of codes over Z4 was extended to four different dualities with their corresponding weight functions (maps assigning weights to the alphabets of the code). In order to do this, we use the flattened form of the codes and construct binary codes analogous to the ones applied to Z4 codes. Since each duality generates more than one weight function, we focus on those weights satisfying the squareness property. Here, by the squareness property, we mean that the weight function wt assigns the weight 0 to the Z4×Z4 elements (0, 0),(2, 2) and the weight 4 to the elements (0, 2) and (2, 0). The main results of this paper are focused on the characterization of these codes and provide a method of construction that can be applied in the generation of such codes whose weight functions satisfy the squareness property.