Abstract
Let $GR(p^r,m)$ denote the Galois ring of characteristic $p^r$ and cardinality $p^{rm}$ seen as a free module of rank $m$ over the integer ring $\mathbb{Z}_{p^r}$. A general formula for the sum of the homogeneous weights of the $p^r$-ary images of elements of $GR(p^r,m)$ under any basis is derived in terms of the parameters of $GR(p^r,m)$. By using a Vandermonde matrix over $GR(p^r,m)$ with respect to the generalized Frobenius automorphism, a constructive proof that every basis of $GR(p^r,m)$ has a unique dual basis is given. It is shown that a basis is self-dual if and only if its automorphism matrix is orthogonal, and that a basis is normal if and only if its automorphism matrix is symmetric.
Highlights
This paper is motivated by the code-theoretic problem of finding the homogeneous bounds on the pr-ary image of a linear block code over the Galois ring GR(pr, m) with respect to any basis over Zpr, as proposed in [9] but which constructed distance-optimal Zpr -codes in terms only of the polynomial basis
The main purpose of this paper is to provide the theory for the existence and uniqueness of the dual basis, and to characterize self-dual basis and normal basis of GR(pr, m), seen as a unitary module over the integer ring Zpr, respectively in terms of the orthogonal and symmetric property of a square m × m matrix, the so-called automorphism matrix, obtained through the action of the generalized Frobenius automorphism on the given basis of GR(pr, m)
We derive a simple formula for the sum of the homogeneous weights of the pr-ary images of elements of the Galois ring GR(pr, m) under any basis over Zpr, in terms only of the parameters of GR(pr, m)
Summary
This paper is motivated by the code-theoretic problem of finding the homogeneous bounds on the pr-ary image of a linear block code over the Galois ring GR(pr, m) with respect to any basis over Zpr , as proposed in [9] but which constructed distance-optimal Zpr -codes in terms only of the polynomial basis. A general formula for the sum of the homogeneous weights of the prary images of elements of the Galois ring GR(pr, m) under any basis over Zpr is derived in terms of the parameters of GR(pr, m).
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