Quasi-Cyclic Codes of Index $1\frac {1}{3}$

Several classes of asymptotically good quasi-twisted codes with a low index ⋮ On the algebraic structure of quasi-cyclic codes of index \(1\frac{1}{2} \) ⋮ \( \mathbb{Z}_p\mathbb{Z}_{p^s} \)-additive cyclic codes are asymptotically good ⋮ Asymptotically good quasi-cyclic codes of fractional index ⋮ Hermitian self-dual 2-quasi-abelian codes ⋮ Asymptotically good \(\mathbb{Z}_p\mathbb{Z}_p[u/\langle u^t\rangle\)-additive cyclic codes] ⋮ Weight distribution of double cyclic codes over \(\mathbb{F}_q + u \mathbb{F}_q\) ⋮ \(\mathbb{F}_2[u\mathbb{F}_2[u]\)-additive cyclic codes are asymptotically good] ⋮ Double circulant matrices ⋮ A modified Gilbert-Varshamov bound for self-dual quasi-twisted codes of index four ⋮ Asymptotically good \(\mathbb{Z}_{p^r} \mathbb{Z}_{p^s} \)-additive cyclic codes ⋮ \(\mathbb{Z}_p \mathbb{Z}_p[v\)-additive cyclic codes are asymptotically good] ⋮ Self-orthogonal quasi-abelian codes are asymptotically good ⋮ Weight distribution of double cyclic codes over Galois rings