Complete graph:K4: Difference between revisions

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

This graph is defined as the complete graph on a set of size four.

Arithmetic functions

Size measures

Function	Value	Explanation
size of vertex set	4	As ${\displaystyle K_{n},n=4}$: ${\displaystyle n=4}$
size of edge set	6	As ${\displaystyle K_{n},n=4}$: ${\displaystyle {\binom {n}{2}}={\binom {4}{2}}=6}$

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 ${\displaystyle K_{n},n=4}$: ${\displaystyle n-1=3}$
eccentricity of a vertex	1	As ${\displaystyle K_{n},n=4}$: 1 (true for all ${\displaystyle n\geq 2}$, independent of ${\displaystyle n}$)

Other numerical invariants

Function	Value	Explanation
clique number	4	As ${\displaystyle K_{n},n=4}$: ${\displaystyle n=4}$
independence number	1	As ${\displaystyle K_{n},n=4}$: 1 (independent of ${\displaystyle n}$)
chromatic number	4	As ${\displaystyle K_{n},n=4}$: ${\displaystyle n=4}$
radius of a graph	1	Due to vertex-transitivity, the radius equals the eccentricity of any vertex, which has been computed above.
diameter of a graph	1	Due to vertex-transitivity, the radius equals the eccentricity of any vertex, which has been computed above.
odd girth	3	As ${\displaystyle K_{n},n=4}$: 3 (because ${\displaystyle n\geq 3}$)
even girth	4	As ${\displaystyle K_{n},n=4}$: 4 (because ${\displaystyle n\geq 4}$)
girth of a graph	3	As ${\displaystyle K_{n},n=4}$: 3 (because ${\displaystyle n\geq 3}$)

Algebraic theory

The adjacency matrix is:

${\displaystyle {\begin{pmatrix}0&1&1&1\\1&0&1&1\\1&1&0&1\\1&1&1&0\\\end{pmatrix}}}$

The matrix is uniquely defined (note that it centralizes all permutations). Below are some important associated algebraic invariants:

Algebraic invariant	Value	Explanation
characteristic polynomial	${\displaystyle t^{4}-6t^{2}-8t-3}$	As ${\displaystyle K_{n},n=4}$: ${\displaystyle (t+1)^{n-1}(t-n+1)=(t+1)^{3}(t-3)=t^{4}-6t^{2}-8t-3}$
minimal polynomial	${\displaystyle t^{2}-2t-3}$	As ${\displaystyle K_{n},n=4}$: ${\displaystyle (t+1)(t-n+1)=t^{2}-(n-2)t-(n-1)=t^{2}-2t-3}$
rank of adjacency matrix	4	As ${\displaystyle K_{n},n=4}$: ${\displaystyle n=4}$
eigenvalues (roots of characteristic polynomial)	-1 (multiplicity 3), 3 (multiplicity 1)	As ${\displaystyle K_{n},n=4}$: -1 (multiplicity ${\displaystyle n-1=3}$), ${\displaystyle n-1=3}$ (multiplicity 1)