共 50 条
- [21] Minimal cyclic codes of length pnq (vol 9, pg 432, 2003)[J]. FINITE FIELDS AND THEIR APPLICATIONS, 2012, 18 (04) : 863 - 863Bakshi, Gurmeet K.Raka, Madhu
- [22] Cyclic codes of length 2e Over F2+uF2[J]. Dianzi Yu Xinxi Xuebao/Journal of Electronics and Information Technology, 2007, 29 (05): : 1124 - 1126Li, PingZhu, Shi-Xin
- [23] CYCLIC CODES OF LENGTH 2(n) OVER Z(4)[J]. COMMUNICATIONS OF THE KOREAN MATHEMATICAL SOCIETY, 2013, 28 (01): : 39 - 54Woo, Sung Sik
- [24] Construction and enumeration for self-dual cyclic codes over Z4 of oddly even length[J]. DESIGNS CODES AND CRYPTOGRAPHY, 2019, 87 (10) : 2419 - 2446Cao, YuanCao, YonglinDougherty, Steven T.Ling, San
- [25] Divisibility properties for covering radius of certain cyclic codes (vol 49, pg 3299, 2003)[J]. IEEE TRANSACTIONS ON INFORMATION THEORY, 2006, 52 (04) : 1798 - 1799Moreno, OCastro, FNMattson, HF
- [26] Classification of optimal linear Z4 rate 1/2 codes of length ≤ 8[J]. ARS COMBINATORIA, 2007, 85 : 287 - 306Gulliver, T. AaronWong, John N. C.
- [27] Cyclic and some constacyclic codes over the ring Z4[u]/⟨u2-1⟩[J]. FINITE FIELDS AND THEIR APPLICATIONS, 2016, 38 : 27 - 39Ozen, MehmetUzekmek, Fatma ZehraAydin, NuhOzzaim, N. Tugba
- [28] AN EXPLICIT REPRESENTATION AND ENUMERATION FOR NEGACYCLIC CODES OF LENGTH 2kn OVER Z4 + uZ4[J]. ADVANCES IN MATHEMATICS OF COMMUNICATIONS, 2021, 15 (02) : 291 - 309Cao, YuanCao, YonglinDinh, Hai Q.Bandi, RamakrishnaFu, Fang-Wei
- [29] A mass formula for negacyclic codes of length 2k and some good negacyclic codes over Z4 + uZ4[J]. CRYPTOGRAPHY AND COMMUNICATIONS-DISCRETE-STRUCTURES BOOLEAN FUNCTIONS AND SEQUENCES, 2017, 9 (02): : 241 - 272Bandi, Rama KrishnaBhaintwal, MaheshanandAydin, Nuh
- [30] IDENTIFYING CYCLIC AND (1+2v)-CONSTACYCLIC CODES OVER Z4[v]/(v3-1) WITH Z4-LINEAR CODES[J]. TWMS JOURNAL OF APPLIED AND ENGINEERING MATHEMATICS, 2023, 13 (03): : 951 - 962Kom, St T.Devi, O. Ratnabala