Abstract
We construct several families of distance-optimal few-weight binary linear codes. As a method, we use the mixed alphabet ring Z2Z2[u], u2 = 0 (viewing Z2Z2[u] as a Z2[u]-module) and three suitable defining sets, each consisting of three simplicial complexes generated by a single maximal element to construct three different families of linear codes over Z2[u], u2 = 0. We explicitly determine their Lee weight distributions and study their Gray images to obtain our results. It turns out that most of the distance-optimal codes obtained in this paper are self-orthogonal and minimal as well. We emphasize that we find an infinite family of binary three-weight projective codes with new parameters, which produce strongly l-walk-regular graphs for every odd l ≥ 3.
Original language | English |
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Article number | 10487980 |
Pages (from-to) | 4865-4878 |
Number of pages | 14 |
Journal | IEEE Transactions on Information Theory |
Volume | 70 |
Issue number | 7 |
DOIs | |
State | Published - 1 Jul 2024 |
Bibliographical note
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Keywords
- few-weight optimal code
- minimal code
- self-orthogonal code
- Simplicial complex
- strongly walk-regular graph