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This paper presents the study of QSD (quasi-self-dual), right-LCD (linear complementary dual), and ACD (additive complementary dual) codes over a noncommutative local ring R= a, b ~|~ 3a =3b=0, ~ a²=a, ~ b²=b, ~ ab=b, ~ ba=a of order 9. Initially, over this ring R, we introduce QSD codes and characterize their multilevel construction. Then, we delve into the study of right LCD codes over the ring R and demonstrate a method for constructing these codes based on ternary LCD codes. Finally, we introduce the right-ACD codes over this ring and present several criteria for the existence of such codes.
Kushwaha et al. (Thu,) studied this question.