\(\mathbb{Z}_4\mathbb{Z}_4 [u]\)-additive cyclic and constacyclic codes
From MaRDI portal
Publication:825939
DOI10.3934/AMC.2020094zbMath1479.94366OpenAlexW3040031661MaRDI QIDQ825939
Habibul Islam, Om Prakash, Patrick Solé
Publication date: 18 December 2021
Published in: Advances in Mathematics of Communications (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.3934/amc.2020094
Related Items (3)
New quantum codes from constacyclic and additive constacyclic codes ⋮ On \(\mathbb{Z}_4\mathbb{Z}_4[u^3 \)-additive constacyclic codes] ⋮ ℤ4R-additive cyclic and constacyclic codes and MDSS codes
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- \(F_3R\)-skew cyclic codes
- Skew constacyclic codes over Galois rings
- \(\mathbb {Z}_2\mathbb {Z}_4\)-additive perfect codes in steganography
- A class of skew-constacyclic codes over \(\mathbb{Z}_{4} + u \mathbb{Z}_{4}\)
- Generalized quasi-cyclic codes: Structural properties and code construction
- \(\mathbb Z_2\mathbb Z_4\)-linear codes: Generator matrices and duality
- On cyclic codes over \(\mathbb{Z}_4\) + \(u\mathbb{Z}_4\) and their \(\mathbb{Z}_4\)-images
- \(Z_2Z_4\)-linear codes: rank and kernel
- The theory of cyclic codes and a generalization to additive codes
- A characterization of \(\mathbb {Z}_{2}\mathbb {Z}_{2}[u\)-linear codes]
- \( \mathbb{Z}_p\mathbb{Z}_{p^s} \)-additive cyclic codes are asymptotically good
- Asymptotically good \(\mathbb{Z}_{p^r} \mathbb{Z}_{p^s} \)-additive cyclic codes
- Cyclic codes over the rings \(\mathbb Z_2 + u\mathbb Z_2\) and \(\mathbb Z_2 + u\mathbb Z_2 + u^2 \mathbb Z_2\)
- A generalization of quasi-twisted codes: multi-twisted codes
- On the structure of \(\mathbb{Z}_2 \mathbb{Z}_2 [u^3\)-linear and cyclic codes]
- ${\mathbb {Z}}_{2}{\mathbb {Z}}_{4}$ -Additive Cyclic Codes, Generator Polynomials, and Dual Codes
- $\BBZ_{2}\BBZ_{4}$ -Additive Cyclic Codes
- ℤ2(ℤ2 + uℤ2)-Additive cyclic codes and their duals
- On ℤ2ℤ2[u-additive codes]
- On ℤprℤps-additive codes
- Association schemes and coding theory
- On $Z_p Z_{p^k}$ -Additive Codes and Their Duality
- $\mathbb {Z}_{2}\mathbb {Z}_{2}[u$ –Cyclic and Constacyclic Codes]
- Linear codes over 𝔽4R and their MacWilliams identity
This page was built for publication: \(\mathbb{Z}_4\mathbb{Z}_4 [u]\)-additive cyclic and constacyclic codes
