Publisher
Springer Science and Business Media LLC
Subject
Applied Mathematics,Computational Mathematics
Reference25 articles.
1. Ashikhmin, A., Knill, E.: Nonbinary quantum stabilizer codes. IEEE Trans. Inf. Theory 47, 3065–3072 (2001)
2. Ashraf, M., Mohammad, G.: Quantum codes from cyclic codes over $${\mathbb{F}}_q+u{\mathbb{F}}_q+v{\mathbb{F}}_q+uv{\mathbb{F}}_q$$. Quantum Inf. Process. 15(10), 4089–4098 (2016)
3. Ashraf, M., Mohammad, G.: Construction of quantum codes from cyclic codes over $${\mathbb{F}}_p +v{\mathbb{F}}_p$$. Int. J. Inf. Coding Theory 3(2), 137–144 (2015)
4. Ashraf, M., Mohammad, G.: Quantum codes over $${\mathbb{F}}_p$$ from cyclic codes over $${\mathbb{F}}_p[u, v]/\langle u^2-1, v^3-v, uv-vu\rangle $$. Cryptogr. Commun. 11(2), 325–335 (2019)
5. Bag, T., Dinh, H.Q., Upadhyay, A.K., Yamaka, W.: New non-binary quantum codes from cyclic codes over product rings. IEEE Commun. Lett. 24(3), 486–490 (2020). https://doi.org/10.1109/LCOMM.2019.2959529
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