A brief survey of perfect Mendelsohn packing and covering designs (Q1302146)
From MaRDI portal
 | This is the item page for this Wikibase entity, intended for internal use and editing purposes. Please use this page instead for the normal view: A brief survey of perfect Mendelsohn packing and covering designs |
scientific article; zbMATH DE number 1340627
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | A brief survey of perfect Mendelsohn packing and covering designs |
scientific article; zbMATH DE number 1340627 |
Statements
A brief survey of perfect Mendelsohn packing and covering designs (English)
0 references
22 September 1999
0 references
A \((v,k,\lambda)\)-perfect Mendelsohn packing (covering) design is a collection of cyclically ordered \(k\)-subsets of a \(v\)-set (called blocks) such that every ordered pair of elements appears \(t\)-apart in at most (at least) \(\lambda\) blocks for all \(t= 1,\dots, k-1\). The packing (covering) problem is to determine the number \(P(v,k,\lambda)\) (\(C(v,k,\lambda)\)), the maximum (minimum) number of blocks in a Mendelsohn packing (covering) design, for all \(v\geq k\). This paper surveys the known results for \(k= 3,4\), and 5. Incomplete perfect Mendelsohn designs are the primary tools used. Open problems are stated for the case \(k=5\).
0 references
packing and covering designs
0 references
incomplete designs
0 references
perfect Mendelsohn designs
0 references
0.90709084
0 references
0.8913813
0 references
0.88433367
0 references
0 references
0.8753335
0 references
