Classification of LCD and self-dual codes over a finite non-unital local ring

Abstract

This work explores LCD and self-dual codes over a noncommutative non-unital ring Ep= r,s ~|~ pr =ps=0,~ r2=r,~ s2=s,~ rs=r,~ sr=s of order p2 where p is a prime. Initially, we study the monomial equivalence of two free Ep-linear codes. In addition, a necessary and sufficient condition is derived for a free Ep-linear code to be MDS and almost MDS (shortly AMDS). Then, we use these results to classify MDS and AMDS LCD codes over E2 and E3 under monomial equivalence for lengths up to 6. Subsequently, we study left self-dual codes over the ring Ep and classify MDS and AMDS left self-dual codes over E2 and E3 for lengths up to 12. Finally, we study self-dual codes over the ring Ep and classify MDS and AMDS self-dual codes over E2 and E3 for short lengths.