On constacyclic codes of length ps over Fpm[u, v]/⟨u2, v2, uv - vu⟩

被引:7
作者
Dinh, Hai Q. [1 ,2 ]
Kewat, Pramod Kumar [3 ]
Kushwaha, Sarika [3 ]
Yamaka, Woraphon [4 ]
机构
[1] TonDuc Thang Univ, Inst Computat Sci, Div Computat Math & Engn, Ho Chi Minh City, Vietnam
[2] Ton Duc Thang Univ, Fac Math & Stat, Ho Chi Minh City, Vietnam
[3] Indian Sch Mines, Indian Inst Technol, Dept Math & Comp, Dhanbad 826004, Bihar, India
[4] Chiang Mai Univ, Fac Econ, Ctr Excellence Econometr, Chiang Mai 52000, Thailand
来源
DISCRETE MATHEMATICS | 2020年 / 343卷 / 08期
关键词
Constacyclic codes; Codes over rings; Cyclic codes; Dual codes; Repeated root codes; CYCLIC CODES; NEGACYCLIC CODES; 2P(S); RINGS;
D O I
10.1016/j.disc.2020.111890
中图分类号
O1 [数学];
学科分类号
0701 ; 070101 ;
摘要
Let p be a prime number, in this paper, we investigate the structures of all constacyclic codes of length p(s) over the ring R-u2,R-v2,R-pm = F-pm[u, v]/< u(2), v(2), uv - vu). The units of the ring R-u2,R-v2,R-pm can be divided into following five forms: alpha, lambda(1) = alpha + delta(1)uv, lambda(2) =alpha + gamma v +delta uv, lambda(3)= alpha + beta u+delta uv, lambda(4) = alpha+beta u+gamma v+delta uv, where alpha, beta, gamma, delta(1) is an element of F-pm* and delta is an element of F-pm. We obtain the algebraic structures of all constacyclic codes of length p(s) over R-u2 ,R-v2,R- pm except (alpha + delta(1)uv)-constacyclic codes, in terms of their polynomial generators and also find the number of codewords in each of these constacyclic codes. The number of constacyclic codes and duals of constacyclic codes corresponding to the units lambda(2), lambda(3) and lambda(4) are determined. We also provide examples to illustrate our results, which include several optimal codes. (C) 2020 Elsevier B.V. All rights reserved.
引用
收藏
页数:24
相关论文
共 50 条
[41]   Repeated-root constacyclic codes of prime power length over Fpm[u]/⟨ua⟩ and their duals [J].
Dinh, Hai Q. ;
Dhompongsa, Sompong ;
Sriboonchitta, Songsak .
DISCRETE MATHEMATICS, 2016, 339 (06) :1706-1715
[42]   Polyadic constacyclic codes over a non-chain ring Fq[u, v]/⟨f (u), g(v), uv - vu⟩ [J].
Goyal, Mokshi ;
Raka, Madhu .
JOURNAL OF APPLIED MATHEMATICS AND COMPUTING, 2020, 62 (1-2) :425-447
[43]   Quantum codes over Fp from cyclic codes over Fp[u, v]/⟨u2-1, v3 - v, uv - vu⟩ [J].
Ashraf, Mohammad ;
Mohammad, Ghulam .
CRYPTOGRAPHY AND COMMUNICATIONS-DISCRETE-STRUCTURES BOOLEAN FUNCTIONS AND SEQUENCES, 2019, 11 (02) :325-335
[44]   On some constacyclic codes over the ring Fpm [u]/⟨u4⟩ [J].
Mahmoodi, H. R. ;
Sobhani, R. .
DISCRETE MATHEMATICS, 2018, 341 (11) :3106-3122
[45]   On b-symbol distance, Hamming distance and RT distance of Type 1 λ-constacyclic codes of length 8ps over Fpm[u]/⟨uk⟩ [J].
Rani, Saroj ;
Dinh, Hai Q. .
JOURNAL OF ALGEBRA AND ITS APPLICATIONS, 2024,
[46]   On a Class of (δ plus αu2)-Constacyclic Codes over Fq[u] =/⟨u4⟩ [J].
Cao, Yuan ;
Cao, Yonglin ;
Gao, Jian .
IEICE TRANSACTIONS ON FUNDAMENTALS OF ELECTRONICS COMMUNICATIONS AND COMPUTER SCIENCES, 2016, E99A (07) :1438-1445
[47]   Quantum codes from skew constacyclic codes over Fpm + vFpm + v2Fpm [J].
Verma, Ram Krishna ;
Prakash, Om ;
Singh, Ashutosh .
PROCEEDINGS OF THE 2020 SEVENTEENTH INTERNATIONAL WORKSHOP ON ALGEBRAIC AND COMBINATORIAL CODING THEORY ALGEBRAIC AND COMBINATORIAL CODING THEORY (ACCT 2020): PROCEEDINGS OF THE SEVENTEENTH INTERNATIONAL WORKSHOP ON ALGEBRAIC AND COMBINATORIAL CODING THEORY ACCT 2020, 2020, :156-161
[48]   Polycyclic codes over Fpm[u]/(u2): Classification, Hamming distance, and annihilators [J].
Boudine, Brahim ;
Laaouine, Jamal .
FINITE FIELDS AND THEIR APPLICATIONS, 2023, 88
[49]   On Constacyclic Codes Over Z4[v]/⟨v2 - v⟩ and Their Gray Images [J].
Dinh, Hai Q. ;
Singh, Abhay Kumar ;
Kumar, Narendra ;
Sriboonchitta, Songsak .
IEEE COMMUNICATIONS LETTERS, 2018, 22 (09) :1758-1761
[50]   Cyclic and constacyclic codes over the ring Z4[u]/⟨u3 - u2⟩ and their Gray images [J].
Ozen, Mehmet ;
Uzekmek, Fatma Zehra ;
Oztas, Elif Segah .
TURKISH JOURNAL OF MATHEMATICS, 2021, 45 (01) :579-596
12345