# Grötzsch graph

Template:Infobox graph
In the mathematical field of graph theory, the **Grötzsch graph** is a triangle-free graph with 11 vertices, 20 edges, chromatic number 4, and crossing number 5. It is named after German mathematician Herbert Grötzsch.

The Grötzsch graph is a member of an infinite sequence of triangle-free graphs, each the Mycielskian of the previous graph in the sequence, starting from the null graph; this sequence of graphs was used by Template:Harvtxt to show that there exist triangle-free graphs with arbitrarily large chromatic number. Therefore, the Grötzsch graph is sometimes also called the Mycielski graph or the Mycielski–Grötzsch graph. Unlike later graphs in this sequence, the Grötzsch graph is the smallest triangle-free graph with its chromatic number Template:Harv.

## Properties

The Grötzsch graph has chromatic index 5, radius 2, girth 4 and diameter 2. It is also a 3-vertex-connected and 3-edge-connected graph. The independence number is 5, and the domination number is 3.

The full automorphism group of the Grötzsch graph is isomorphic to the dihedral group D_{5} of order 10, the group of symmetries of a regular pentagon, including both rotations and reflections.

The characteristic polynomial of the Grötzsch graph is

## Applications

The existence of the Grötzsch graph demonstrates that the assumption of planarity is necessary in Grötzsch's theorem Template:Harv that every triangle-free planar graph is 3-colorable.

Template:Harvtxt used a modified version of the Grötzsch graph to disprove a conjecture of Template:Harvs on the chromatic number of triangle-free graphs with high degree. Häggkvist's modification consists of replacing each of the five degree-four vertices of the Grötzsch graph by a set of three vertices, replacing each of the five degree-three vertices of the Grötzsch graph by a set of two vertices, and replacing the remaining degree-five vertex of the Grötzsch graph by a set of four vertices. Two vertices in this expanded graph are connected by an edge if they correspond to vertices connected by an edge in the Grötzsch graph. The result of Häggkvist's construction is a 10-regular triangle-free graph with 29 vertices and chromatic number 4, disproving the conjecture that there is no 4-chromatic triangle-free *n*-vertex graph in which each vertex has more than *n*/3 neighbours.

## Related graphs

The Grötzsch graph shares several properties with the Clebsch graph, a distance-transitive graph with 16 vertices and 40 edges: both the Grötzsch graph and the Clebsch graph are triangle-free and four-chromatic, and neither of them has any six-vertex induced paths. These properties are close to being enough to characterize these graphs: the Grötzsch graph is an induced subgraph of the Clebsch graph, and every triangle-free four-chromatic P6-free graph is likewise an induced subgraph of the Clebsch graph that in turn contains the Grötzsch graph as an induced subgraph Template:Harv. The Chvátal graph is another small triangle-free 4-chromatic graph. However, unlike the Grötzsch graph and the Clebsch graph, the Chvátal graph has a six-vertex induced path.

## References

- {{#invoke:citation/CS1|citation

|CitationClass=citation }}.

- {{#invoke:citation/CS1|citation

|CitationClass=citation }}.

- {{#invoke:citation/CS1|citation

|CitationClass=citation }}.

- {{#invoke:citation/CS1|citation

|CitationClass=citation }}.

- {{#invoke:citation/CS1|citation

|CitationClass=citation }}.

- {{#invoke:citation/CS1|citation

|CitationClass=citation }}.