Petersen graph: Difference between revisions

Latest revision as of 21:21, 23 December 2012

This article defines a particular undirected graph, i.e., the definition here determines the graph uniquely up to graph isomorphism.
View a complete list of particular undirected graphs

Definition

The Petersen graph is a particular undirected graph on 10 vertices that can be defined in the following equivalent ways:

It is the complement of the line graph of complete graph:K5.
It is the odd graph with parameter 3, i.e., the graph $O_{3}$ . Explicitly, this is the Kneser graph $KG_{5,2}$ : its vertices are identified with subsets of size two of a 5-element set, and two vertices are adjacent if and only if the corresponding subsets are disjoint.
It is the unique (3,5)-cage.

Arithmetic functions

Size measures

Function	Value	Explanation
size of vertex set	10	As $O_{n},n=3$ : ${\binom {2n-1}{n-1}}={\binom {5}{2}}=10$
size of edge set	15	As $O_{n},n=3$ : ${\frac {1}{2}}{\binom {2n-1}{n-1,n-1,1}}={\frac {1}{2}}{\binom {5}{2,2,1}}=15$

Numerical invariants associated with vertices

Since the graph is a vertex-transitive graph, any numerical invariant associated to a vertex must be equal on all vertices of the graph. Below are listed some of these invariants:

Function	Value	Explanation
degree of a vertex	3	As $O_{n},n=3$ : $n=3$
eccentricity of a vertex	2	As $O_{n},n=3$ : $n-1=2$

Other numerical invariants

Function	Value	Explanation
clique number	2	As $O_{n},n=3$ : 2, since $n\geq 3$
independence number	4	Fill this in later
chromatic number	3
radius of a graph	2	Due to vertex-transitivity, the radius equals the eccentricity of any vertex, which has been computed above.
diameter of a graph	2	Due to vertex-transitivity, the radius equals the eccentricity of any vertex, which has been computed above.
odd girth	5	As $O_{n},n=3$ : $2n-1=2(3)-1=5$
even girth	6	As $O_{n},n=3$ : 6 (we use that $n\geq 3$ )
girth of a graph	5	As $O_{n},n=3$ : $\min\{2n-1,6\}$

Graph properties

Property	Satisfied?	Explanation
connected graph	Yes	all odd graphs are connected. More generally, all Kneser graphs $KG_{m,k}$ are connected for $k<m/2$ .
regular graph	Yes	all odd graphs, and more generally all Kneser graphs, are regular
vertex-transitive graph	Yes	all odd graphs, and more generally all Kneser graphs, are vertex-transitive
strongly regular graph	Yes	This follows on account of it being a Kneser graph of the form $KG_{m,2}$ , i.e., the key is that the subset sizes are 2
edge-transitive graph	Yes
symmetric graph	Yes
distance-transitive graph	Yes
self-complementary graph	No	The degree is 3 and the number of vertices is 10. For the graph to be self-complementary, a necessary condition is that the number of vertices should be 1 + twice the degree
cubic graph	Yes	The degree of every vertex is 3, as computed above.
bridgeless graph	Yes
cage	Yes
snark	Yes

@@ Line 1: / Line 1: @@
 {{particular undirected graph}}
+[[File:Petersen graph.svg|thumb|300px|right|the Petersen graph is typically drawn as a pentagon with a pentagram inside.]]
+[[File:Kneser graph KG(5,2).svg|thumb|300px|right|the Petersen graph as KG(5,2). The subsets corresponding to each vertex are indicated in the bubble for that vertex.]]
 ==Definition==
@@ Line 7: / Line 8: @@
 # It is the [[defining ingredient::complement of a graph|complement]] of the [[defining ingredient::line graph]] of [[defining ingredient::complete graph:K5]].
 # It is the [[defining ingredient::odd graph]] with parameter 3, i.e., the graph <math>O_3</math>. Explicitly, this is the [[defining ingredient::Kneser graph]] <math>KG_{5,2}</math>: its vertices are identified with subsets of size two of a 5-element set, and two vertices are adjacent if and only if the corresponding subsets are disjoint.
-# It is the unique 5-[[defining ingredient::cage]].
+# It is the unique (3,5)-[[defining ingredient::cage]].
 ==Arithmetic functions==