In this paper we study Butson Hadamard matrices, and codes over finite rings coming from these matrices in logarithmic form, called BH-codes. We introduce a new morphism of Butson Hadamard matrices through a generalized Gray map on the matrices in logarithmic form, which is comparable to the morphism given in a recent note of Ó Catháin and Swartz. That is, we show how, if given a Butson Hadamard matrix over the $$k{\mathrm{th}}$$
k
th
roots of unity, we can construct a larger Butson matrix over the $$\ell \mathrm{th}$$
ℓ
th
roots of unity for any $$\ell $$
ℓ
dividing k, provided that any prime p dividing k also divides $$\ell $$
ℓ
. We prove that a $${\mathbb {Z}}_{p^s}$$
Z
p
s
-additive code with p a prime number is isomorphic as a group to a BH-code over $${\mathbb {Z}}_{p^s}$$
Z
p
s
and the image of this BH-code under the Gray map is a BH-code over $${\mathbb {Z}}_p$$
Z
p
(binary Hadamard code for $$p=2$$
p
=
2
). Further, we investigate the inherent propelinear structure of these codes (and their images) when the Butson matrix is cocyclic. Some structural properties of these codes are studied and examples are provided.
In this paper we study Butson Hadamard matrices, and codes over finite rings coming from these matrices in logarithmic form, called BH-codes. We introduce a new morphism of Butson Hadamard matrices through a generalized Gray map on the matrices in logarithmic form, which is comparable to the morphism given in a recent note of Ó Catháin and Swartz. That is, we show how, if given a Butson Hadamard matrix over the k th roots of unity, we can construct a larger Butson matrix over the ℓ th roots of unity for any ℓ dividing k, provided that any prime p dividing k also divides ℓ. We prove that a Z p s-additive code with p a prime number is isomorphic as a group to a BH-code over Z p s and the image of this BH-code under the Gray map is a BH-code over Z p (binary Hadamard code for p = 2). Further, we investigate the inherent propelinear structure of these codes (and their images) when the Butson matrix is cocyclic. Some structural properties of these codes are studied and examples are provided.
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