Abstract
It is proved that for integers b, r such that 3≤b<r≤b+12-1, there exists a red/blue edge-colored graph such that the red degree of every vertex is r, the blue degree of every vertex is b, yet in the closed neighbourhood of every vertex there are more blue edges than red edges. The upper bound r≤b+12-1 is best possible for any b≥3. We further extend this theorem to more than two colours, and to larger neighbourhoods. A useful result required in some of our proofs, of independent interest, is that for integers r, t such that 0≤t≤r22-5r3/2, there exists an r-regular graph in which each open neighbourhood induces precisely t edges. Several explicit constructions are introduced and relationships with constant linked graphs, (r, b)-regular graphs and vertex transitive graphs are revealed.
Original language | English |
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Article number | 106 |
Journal | Graphs and Combinatorics |
Volume | 40 |
Issue number | 6 |
DOIs | |
State | Published - Dec 2024 |
Bibliographical note
Publisher Copyright:© The Author(s) 2024.
Keywords
- (r,c)-constant graphs
- 05C15
- 05C70
- Cayley graphs
- Local vs global properties
ASJC Scopus subject areas
- Theoretical Computer Science
- Discrete Mathematics and Combinatorics