On a class of left metacyclic codes

Abstract

Let G(m,3,r)= x,y xm=1, y3=1,yx=xry be a metacyclic group of order 3m, where gcd(m,r)=1, 1<r<m and r3 1 (mod m). Then left ideals of the group algebra Fq[G(m,3,r)] are called left metacyclic codes over Fq of length 3m, and abbreviated as left G(m,3,r)-codes. A system theory for left G(m,3,r)-codes is developed for the case of gcd(m,q)=1 and r qε for some positive integer ε, only using finite field theory and basic theory of cyclic codes and skew cyclic codes. The fact that any left G(m,3,r)-code is a direct sum of concatenated codes with inner codes Ai and outer codes Ci is proved, where Ai is a minimal cyclic code over Fq of length m and Ci is a skew cyclic code of length 3 over an extension field of Fq. Then an explicit expression for each outer code in any concatenated code is provided. Moreover, the dual code of each left G(m,3,r)-code is given and self-orthogonal left G(m,3,r)-codes are determined.