On constacyclic codes of length 4p<sup>s</sup>over F<inf>p<sup>m</sup></inf>+uF<inf>p<sup>m</sup></inf>
© 2016 Elsevier B.V. For any odd prime p such that p m ≡1(mod4), the structures of all λ-constacyclic codes of length 4p s over the finite commutative chain ring F p m +uF p m (u 2 =0) are established in terms of their generator polynomials. If the unit λ is a square, each λ-constacyclic code of len...
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| Main Authors: | , , |
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| Format: | Journal |
| Published: |
2018
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| Online Access: | https://www.scopus.com/inward/record.uri?partnerID=HzOxMe3b&scp=85008177631&origin=inward http://cmuir.cmu.ac.th/jspui/handle/6653943832/47006 |
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| Institution: | Chiang Mai University |
| Summary: | © 2016 Elsevier B.V. For any odd prime p such that p m ≡1(mod4), the structures of all λ-constacyclic codes of length 4p s over the finite commutative chain ring F p m +uF p m (u 2 =0) are established in terms of their generator polynomials. If the unit λ is a square, each λ-constacyclic code of length 4p s is expressed as a direct sum of an −α-constacyclic code and an α-constacyclic code of length 2p s . In the main case that the unit λ is not a square, it is shown that any nonzero polynomial of degree < 4 over F p m is invertible in the ambient ring (F p m + uF p m )[ x]〈 x 4 p s− λ〉. When the unit λ is of the form λ=α+uβ for nonzero elements α,β of F p m , it is obtained that the ambient ring (F p m + uF p m )[ x]〈 x 4 p s−( α+ u β)〉 is a chain ring with maximal ideal 〈x 4 −α 0 〉, and so the (α+uβ)-constacyclic codes are 〈(x 4 −α 0 ) i 〉, for 0≤i≤2p s . For the remaining case, that the unit λ is not a square, and λ=γ for a nonzero element γ of F p m , it is proven that the ambient ring (F p m + uF p m )[ x]〈 x 4 p s− γ〉 is a local ring with the unique maximal ideal 〈x 4 −γ 0 ,u〉. Such λ-constacyclic codes are then classified into 4 distinct types of ideals, and the detailed structures of ideals in each type are provided. Among other results, the number of codewords, and the dual of each λ-constacyclic code are provided. |
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