Classification of the Z2Z4-linear Hadamard codes and their automorphism groups

Abstract

A Z2Z4-linear Hadamard code of length α+2β=2t is a binary Hadamard code which is the Gray map image of a Z2Z4-additive code with α binary coordinates and β quaternary coordinates. It is known that there are exactly [(t-1)/2] and [t/2] nonequivalent Z2Z4-linear Hadamard codes of length 2t, with α=0 and α=0, respectively, for all t≥ 3. In this paper, it is shown that each Z2Z4-linear Hadamard code with α=0 is equivalent to a Z2Z4-linear Hadamard code with α=0; so there are only [t/2] nonequivalent Z2Z4-linear Hadamard codes of length 2t. Moreover, the order of the monomial automorphism group for the Z2Z4-additive Hadamard codes and the permutation automorphism group of the corresponding Z2Z4-linear Hadamard codes are given.