Construction of Hadamard ℤ2 ℤ4 Q8-Codes for Each Allowable Value of the Rank and Dimension of the Kernel

This work deals with Hadamard Z2Z4Q8-codes, which are binary codes after a Gray map from a subgroup of a direct product of Z2, Z4 and Q8 groups, where Q8 is the quaternionic group. In a previous work, these kind of codes were classified in five shapes. In this paper we analyze the allowable range of values for the rank and dimension of the kernel, which depends on the particular shape of the code. We show that all these codes can be represented in a standard form, from a set of generators, which help to understand the characteristics of each shape. The main results we present are the characterization of Hadamard Z2Z4Q8-codes as a quotient of a semidirect product of Z2Z4-linear codes and, on the other hand, the construction of Hadamard Z2Z4Q8-codes with each allowable pair of values for the rank and dimension of the kernel.