Recursive constructions for \(s\)-resolvable \(t\)-designs
From MaRDI portal
Publication:2334440
DOI10.1007/s10623-019-00653-6zbMath1434.05024OpenAlexW2953145868WikidataQ127653841 ScholiaQ127653841MaRDI QIDQ2334440
Publication date: 7 November 2019
Published in: Designs, Codes and Cryptography (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/s10623-019-00653-6
Related Items (7)
A method of constructing 2-resolvable \(t\)-designs for \(t=3,4\) ⋮ An extending theorem for \(s\)-resolvable \(t\)-designs ⋮ Point-missing \(s\)-resolvable \(t\)-designs: infinite series of 4-designs with constant index ⋮ Resolutions of the designs in two infinite series of 4-designs ⋮ On t‐designs and s‐resolvable t‐designs from hyperovals ⋮ Partially balanced t-designs ⋮ On simple 3-designs having 2-resolutions
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Simple \(t\)-designs: a recursive construction for arbitrary \(t\)
- Non-trivial \(t\)-designs without repeated blocks exist for all \(t\)
- On the existence of an infinite family of simple 5-designs
- On the construction of \(t\)-designs and the existence of some new infinite families of simple 5-designs
- New infinite families of simple 5-designs
- Combining \(t\)-designs
- Partitioning the planes of \(AG_{2m}(2)\) into 2-designs
- Some new 2-resolvable Steiner quadruple systems
- Semiregular large sets
- A recursive construction for simple \(t\)-designs using resolutions
- Locally trivial t-designs and t-designs without repeated blocks
- A family of 4-designs with block size 9
- A new family of 4-designs
- Extending large sets of \(t\)-designs
- Steiner systems with automorphism groups \(PSL(2,71)\), \(PSL(2,83)\), and \(P\Sigma L(2,3^5)\)
- New large sets oft-designs with prescribed groups of automorphisms
- An infinite class of 4-designs
This page was built for publication: Recursive constructions for \(s\)-resolvable \(t\)-designs
