The weight hierarchy of a family of cyclic codes with arbitrary number of nonzeroes
From MaRDI portal
Publication:2396767
DOI10.1016/j.ffa.2017.01.002zbMath1403.94117arXiv1702.01309OpenAlexW2586592045MaRDI QIDQ2396767
Publication date: 24 May 2017
Published in: Finite Fields and their Applications (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1702.01309
Algebraic coding theory; cryptography (number-theoretic aspects) (11T71) Linear codes (general theory) (94B05) Cyclic codes (94B15)
Related Items (2)
A survey on the applications of Niho exponents ⋮ Notes on generalized Hamming weights of some classes of binary codes
Cites Work
- Weight distributions of a class of cyclic codes with arbitrary number of nonzeros in quadratic case
- The weight distribution of linear codes over \(GF(q^l)\) having generator matrix over \(GF(q)\)
- The weight distribution of irreducible cyclic codes with block lengths \(n_1 ((q^\ell-1)/N)\)
- On the weight hierarchy of irreducible cyclic codes
- On the weight hierarchy of the semiprimitive codes
- The Weight Hierarchy of Some Reducible Cyclic Codes
- Generalized Hamming Weights of Irreducible Cyclic Codes
- List decoding from erasures: bounds and code constructions
- Generalized Hamming weights for linear codes
- On the optimum bit orders with respect to the state complexity of trellis diagrams for binary linear codes
- On subfield subcodes of modified Reed-Solomon codes (Corresp.)
- Dimension/length profiles and trellis complexity of linear block codes
- Weight Distribution of a Class of Cyclic Codes With Arbitrary Number of Zeros
This page was built for publication: The weight hierarchy of a family of cyclic codes with arbitrary number of nonzeroes
