Construction of self-orthogonal codes over a commutative non-unitary ring of order 25
Abstract
Codes over non-unitary rings have been studied recently. In particular, codes over the commutative non-unitary ring Ip (in the classification of Fine) of order p2 where p is a prime are being considered. For p=2 (resp. p=3), three categories of codes over Ip have been studied: self-orthogonal codes, quasi self-dual codes, and self-dual codes over Ip. Using some related mass formulas and building-up constructions, classifications of these codes have been done up to the permutation equivalence (resp. the monomial equivalence) for certain small lengths. In this paper, we take the prime p=5 and consider the ring I5. We introduce the notion of linear codes over I5. We also define the same three categories of linear I5-codes, study the structures of these I5-codes and relate them to their associated residue and torsion codes. We classify the three categories of codes completely in lengths at most 4 up to the monomial equivalence for a given type \ k1 , k2 \. Moreover, in the paper of Alahmadi et al. regarding the mass formula for self-orthogonal codes over Ip, mistakes in the classification of quasi self-dual codes over I5 had been made such as incorrect automorphism group order of some codes or inconsistency with the mass formula for self-orthogonal codes over Ip for length n=2 and type \ 1 , 0 \ and for length n=3 and type \ 1, 1 \. We correct and improve such results.
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