Abstract
In this paper, we continue our study of 2-colorings in hypergraphs (see, Henning and Yeo, 2013). A hypergraph is 2-colorable if there is a 2-coloring of the vertices with no monochromatic hyperedge. It is known (see Thomassen, 1992) that every 4-uniform 4-regular hypergraph is 2-colorable. Our main result in this paper is a strengthening of this result. For this purpose, we define a vertex in a hypergraph H to be a free vertex in H if we can 2-color V(H)∖{v} such that every hyperedge in H contains vertices of both colors (where v has no color). We prove that every 4-uniform 4-regular hypergraph has a free vertex. This proves a conjecture in Henning and Yeo (2015). Our proofs use a new result on not-all-equal 3-SAT which is also proved in this paper and is of interest in its own right.
Original language | English |
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Pages (from-to) | 2285-2292 |
Number of pages | 8 |
Journal | Discrete Mathematics |
Volume | 341 |
Issue number | 8 |
DOIs | |
Publication status | Published - Aug 2018 |
Keywords
- 2-colorable
- Bipartite
- Free vertex
- Hypergraphs
- NAE-3-SAT
- Transversal
ASJC Scopus subject areas
- Theoretical Computer Science
- Discrete Mathematics and Combinatorics