Abstract
A well-known observation of Lovász is that if a hypergraph is not 2-colourable, then at least one pair of its edges intersect at a single vertex. In this short paper we consider the quantitative version of Lovász's criterion. That is, we ask how many pairs of edges intersecting at a single vertex should belong to a non-2-colourable n-uniform hypergraph. Our main result is an exact answer to this question, which further characterizes all the extremal hypergraphs. The proof combines Bollobás's two families theorem with Pluhar's randomized colouring algorithm.
| Original language | English |
|---|---|
| Pages (from-to) | 956-960 |
| Number of pages | 5 |
| Journal | Combinatorics Probability and Computing |
| Volume | 29 |
| Issue number | 6 |
| DOIs | |
| State | Published - Nov 2020 |
All Science Journal Classification (ASJC) codes
- Theoretical Computer Science
- Statistics and Probability
- Computational Theory and Mathematics
- Applied Mathematics