Super-simple group divisible designs with block size 4 and index 2
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Publication:974497
DOI10.1016/j.jspi.2010.02.020zbMath1188.62232OpenAlexW2016752999MaRDI QIDQ974497
Publication date: 3 June 2010
Published in: Journal of Statistical Planning and Inference (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.jspi.2010.02.020
Related Items (10)
Super-simple pairwise balanced designs with block sizes 3 and 4 ⋮ \(4^2\)-decomposable super-simple \((v,4,8)\)-BIBDs ⋮ The existence of λ $\lambda $‐decomposable super‐simple (4,2λ) $(4,2\lambda )$‐GDDs of type gu ${g}^{u}$ with λ=2,4 $\lambda =2,4$ ⋮ Decomposable super‐simple BIBDs with block size 4 and index 4, 6 ⋮ Super-simple group divisible designs with block size 4 and index \(\lambda = 7,8\) ⋮ Super-simple \((5, 4)\)-GDDs of group type \(g^u\) ⋮ Super-simple group divisible designs with block size 4 and index 9 ⋮ On super-simple group divisible designs with block size four and index \(\lambda =3,4,6\) ⋮ Further results on the existence of super-simple pairwise balanced designs with block sizes 3 and 4 ⋮ Super-simple group divisible designs with block size 4 and index 5
Cites Work
- Super-simple \((v,5,4)\) designs
- Super-simple balanced incomplete block designs with block size 4 and index 5
- Super-simple (\(v\),\,5,\,2)-designs.
- Super-simple balanced incomplete block designs with block size 4 and index 6
- On the existence of super-simple designs with block size 4
- On the existence of super-simple \((v,4,4)\)-BIBDs
- Super-simple Steiner pentagon systems
- Super-simple \((\nu, 5, 5)\) designs
- Super-simple holey Steiner pentagon systems and related designs
- New upper bounds on the minimum size of covering designs
- On optimal superimposed codes
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