Matchstick graph

The unique smallest cubic matchstick graph
Harborth graph
Vertices52
Edges104
Radius6
Diameter9
Girth3
Table of graphs and parameters
3-regular girth-5 matchstick graph
Vertices54
Edges81
Girth5
Table of graphs and parameters

In geometric graph theory, a branch of mathematics, a matchstick graph is a graph that can be drawn in the plane in such a way that its edges are line segments with length one that do not cross each other. That is, it is a graph that has an embedding which is simultaneously a unit distance graph and a plane graph. For this reason, matchstick graphs have also been called planar unit-distance graphs.[1] Informally, matchstick graphs can be made by placing noncrossing matchsticks on a flat surface, hence the name.[2]

  1. ^ Gervacio, Severino V.; Lim, Yvette F.; Maehara, Hiroshi (2008), "Planar unit-distance graphs having planar unit-distance complement", Discrete Mathematics, 308 (10): 1973–1984, doi:10.1016/j.disc.2007.04.050, MR 2394465
  2. ^ Weisstein, Eric W., "Matchstick graph", MathWorld