Construction of optimal ternary constant weight codes via Bhaskar Rao designs
From MaRDI portal
Publication:924950
DOI10.1016/j.disc.2006.06.034zbMath1158.05009OpenAlexW2009385196MaRDI QIDQ924950
Publication date: 29 May 2008
Published in: Discrete Mathematics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.disc.2006.06.034
Related Items (7)
On a class of optimal constant weight ternary codes ⋮ A family of diameter perfect constant-weight codes from Steiner systems ⋮ Completely reducible super-simple designs with block size four and related super-simple packings ⋮ Completely reducible super-simple designs with block size five and index two ⋮ Constructions of optimal quaternary constant weight codes via group divisible designs ⋮ Optimal three-dimensional optical orthogonal codes of weight three ⋮ Hanani triple packings and optimal \(q\)-ary codes of constant weight three
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Genetic algorithms in coding theory -- a table for \(A_ 3(n, d)\)
- Regular group divisible designs and Bhaskar Rao designs with block size three
- Optimal constant weight codes over \(Z_k\) and generalized designs
- Bhaskar Rao designs with block size four
- Starters and related codes
- On perfect ternary constant weight codes
- A class of perfect ternary constant-weight codes
- Ternary constant weight codes
- More \(c\)-Bhaskar Rao designs with small block size
- Maximum distance holey packings and related codes
- Upper bounds for constant-weight codes
- Some new codes from algebraic curves
- Generalized Steiner systems GS4 (2, 4, v, g) for g = 2, 3, 6
- A new table of constant weight codes
- Some ternary and quaternary codes and associated sphere packings
- A lower bound for ternary constant weight codes
- Bounds on mixed binary/ternary codes
- On the constructions of constant-weight codes
- 4‐*GDDs(3n) and generalized Steiner systems GS(2, 4, v, 3)
- On the Svanstrom bound for ternary constant-weight codes
- Bounds and constructions for ternary constant-composition codes
- Generalized steiner triple systems with group size five
- On c‐Bhaskar Rao designs with block size 4
- Generalized Steiner systems GS\((2,4,\nu,2)\) with \(\nu\) a prime power \(\equiv 7\pmod{12}\)
This page was built for publication: Construction of optimal ternary constant weight codes via Bhaskar Rao designs
