scientific article; zbMATH DE number 7124316
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Publication:5241153
zbMath1423.94152MaRDI QIDQ5241153
Jay A. Wood, Philippe Langevin
Publication date: 30 October 2019
Title: zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Related Items (4)
The extension theorem for the Lee and Euclidean weights over \(\mathbb{Z}/p^k \mathbb{Z}\) ⋮ Isometry groups of additive codes over finite fields ⋮ The extension theorem for Lee and Euclidean weight codes over integer residue rings ⋮ Two approaches to the extension problem for arbitrary weights over finite module alphabets
Cites Work
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- Two analogues of Maillet's determinant
- MacWilliams extension theorems and the local-global property for codes over Frobenius rings
- Finite-ring combinatorics and MacWilliams' equivalence theorem
- Characteristics of invariant weights related to code equivalence over rings
- Relative one-weight linear codes
- MacWilliams' extension theorem for bi-invariant weights over finite principal ideal rings
- The structure of linear codes of constant weight
- FOUNDATIONS OF LINEAR CODES DEFINED OVER FINITE MODULES: THE EXTENSION THEOREM AND THE MACWILLIAMS IDENTITIES
- Duality for modules over finite rings and applications to coding theory
- Characterization of finite Frobenius rings
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