Construction of skew cyclic codes over $\mathbb F_q+v\mathbb F_q$

Gürsoy, Fatmanur; Şiap, İrfan; Yıldız, Bahattin

doi:10.3934/amc.2014.8.313

Cited by 69 publications

(44 citation statements)

References 9 publications

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“…The proof of the following theorem is similar to that of (Ref. [8], Theorem 6), so we omit the proof here.…”

Section: Proofmentioning

confidence: 98%

“…Lemma 3 (Ref. [8], Lemma 2) Let g(x) ∈ F q [x, θ k ] be a monic right divisor of x n − 1. If (n, t k ) = 1, then…”

Section: Proofmentioning

confidence: 99%

“…[6], T. Abualrub and P. Seneviratne studied skew cyclic codes over the ring F 2 + vF 2 with v 2 = v by defining the automorphism θ as: [7], Gao investigated the skew cyclic codes over F p + vF p with v 2 = v. In the recent work of Ref. [8], Gursoy et al studied the structural properties of skew cyclic codes over F q + vF q with v 2 = v, which used a different automorphism from the one given in Ref. [7].…”

Section: Introductionmentioning

confidence: 99%

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Skew Cyclic Codes over a Non‐chain Ring

2017

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“…The proof of the following theorem is similar to that of (Ref. [8], Theorem 6), so we omit the proof here.…”

Section: Proofmentioning

confidence: 98%

“…Lemma 3 (Ref. [8], Lemma 2) Let g(x) ∈ F q [x, θ k ] be a monic right divisor of x n − 1. If (n, t k ) = 1, then…”

Section: Proofmentioning

confidence: 99%

Section: Introductionmentioning

confidence: 99%

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Skew Cyclic Codes over a Non‐chain Ring

2017

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“…have been studied in [1,2,5,13,21,23,26,30,32,33] as a generalization of skew cyclic codes over finite fields. Recently, P. Li et al [28] gave the structure of (1 + u)-constacyclic codes over the ring Z 2 Z 2 [u] and Aydogdu et al [6] studied Z 2 Z 2 [u]-cyclic and constacyclic codes.…”

Section: Introductionmentioning

confidence: 99%

$\mathbb{Z}_{q}(\mathbb{Z}_{q}+u\mathbb{Z}_{q})-$ linear skew constacyclic codes

Melakhessou¹,

Aydın

Hebbache

et al. 2020

Journal of Algebra Combinatorics Discrete Structures and Applications

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In this paper, we study skew constacyclic codes over the ring ZqR where R = Zq + uZq, q = p s for a prime p and u 2 = 0. We give the definition of these codes as subsets of the ring Z α q R β. Some structural properties of the skew polynomial ring R[x, Θ] are discussed, where Θ is an automorphism of R. We describe the generator polynomials of skew constacyclic codes over ZqR, also we determine their minimal spanning sets and their sizes. Further, by using the Gray images of skew constacyclic codes over ZqR we obtained some new linear codes over Z4. Finally, we have generalized these codes to double skew constacyclic codes over ZqR.

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“…They have been further generalized in many ways [8,10,11]. In recent years many researchers have shown interest in this direction [4,21,16,14], and many new results on codes over different rings in the setting of skew polynomial rings have been obtained. However, almost all this work has been done in the setting of skew-polynomial rings with automorphism only.…”

Section: Introductionmentioning

confidence: 99%

A class of skew-cyclic codes over $\mathbb{Z}_4+u\mathbb{Z}_4$ with derivation

Sharma¹,

Bhaintwal²

2018

Advances in Mathematics of Communications

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In this paper, we study a class of skew-cyclic codes using a skew polynomial ring over R = Z 4 + uZ 4 ; u 2 = 1, with an automorphism θ and a derivation δ θ. We generalize the notion of cyclic codes to skew-cyclic codes with derivation, and call such codes as δ θ-cyclic codes. Some properties of skew polynomial ring R[x, θ, δ θ ] are presented. A δ θ-cyclic code is proved to be a left R[x, θ, δ θ ]-submodule of R[x,θ,δ θ ] x n −1. The form of a parity-check matrix of a free δ θ-cyclic codes of even length n is presented. These codes are further generalized to double δ θ-cyclic codes over R. We have obtained some new good codes over Z 4 via Gray images and residue codes of these codes. The new codes obtained have been reported and added to the database of Z 4-codes [2].

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Construction of skew cyclic codes over $\mathbb F_q+v\mathbb F_q$

Cited by 69 publications

References 9 publications

Skew Cyclic Codes over a Non‐chain Ring

Skew Cyclic Codes over a Non‐chain Ring

$\mathbb{Z}_{q}(\mathbb{Z}_{q}+u\mathbb{Z}_{q})-$ linear skew constacyclic codes

A class of skew-cyclic codes over $\mathbb{Z}_4+u\mathbb{Z}_4$ with derivation

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