Abstract
In this study, we consider codes over Euclidean domains modulo their ideals. In the first half of the study, we deal with arbitrary Euclidean domains. We show that the product of generator matrices of codes over the rings mod a and mod b produces generator matrices of all codes over the ring mod a b , i.e., this correspondence is onto. Moreover, we show that if a and b are coprime, then this correspondence is one-to-one, i.e., there exist unique codes over the rings mod a and mod b that produce any given code over the ring mod a b through the product of their generator matrices. In the second half of the study, we focus on the typical Euclidean domains such as the rational integer ring, one-variable polynomial rings, rings of Gaussian and Eisenstein integers, p-adic integer rings and rings of one-variable formal power series. We define the reduced generator matrices of codes over Euclidean domains modulo their ideals and show their uniqueness. Finally, we apply our theory of reduced generator matrices to the Hecke rings of matrices over these Euclidean domains.
Highlights
The structural properties of quasi-cyclic (QC) [1,2] and generalized quasi-cyclic (GQC) codes [3,4,5]have been reported
Cyclic codes can be extended to pseudo-cyclic (PC) and generalized pseudo-cyclic (GPC) codes [6]
Similar constructions for the rational integer ring Z are known as integer codes and generalized integer codes [7]
Summary
The structural properties of quasi-cyclic (QC) [1,2] and generalized quasi-cyclic (GQC) codes [3,4,5]. The result of the Euclidean division is not unique; for a, b ∈ R with b 6= 0, the quotient s and the remainder r are not always unique in a = sb + r and r = 0 or ψ(r ) < ψ(b). We apply the uniqueness of the Euclidean divisions to show that there exists a unique reduced generator matrix for each R-module in M. We show that the generator matrices of R-modules in M are deeply concerned with the theory of Hecke rings.
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