Kneser graph

Definition

Suppose ${\displaystyle n}$ and ${\displaystyle k}$ are positive integers. The Kneser graph ${\displaystyle KG_{n,k}}$ is an undirected graph defined as follows. Fix a set of size ${\displaystyle n}$ (we usually take the set as ${\displaystyle \{1,2,\dots ,n\}}$ for convenience). Then:

1. The vertex set of ${\displaystyle KG_{n,k}}$ is the collection of ${\displaystyle k}$-element subsets of the fixed set of size ${\displaystyle n}$.
2. The edge set of ${\displaystyle KG_{n,k}}$ is defined as follows: two vertices of ${\displaystyle KG_{n,k}}$ are adjacent if and only if they are disjoint when viewed as subsets of the ${\displaystyle n}$-element set.

Particular cases

Classes of cases

Condition on ${\displaystyle n}$ and ${\displaystyle k}$	Conclusion
${\displaystyle k>n}$	The vertex set is empty, so the graph is a graph on no vertices
${\displaystyle k=n}$	one-point graph
${\displaystyle n/2<k<n}$	The vertex set is non-empty, but the edge set is empty, so the graph is an empty graph
${\displaystyle k=n/2}$	In this case, the graph is a matching graph: it is a disjoint union of 2-cliques, with one 2-clique for each partition of the ${\displaystyle n}$-set into two disjoint pieces of equal size.
${\displaystyle 1<k<n/2}$	This is the interesting case. In this case, the graph is connected and non-empty, but is not a complete graph.
${\displaystyle k=1}$	complete graph ${\displaystyle K_{n}}$
${\displaystyle k=0}$	one-point graph

First few nontrivial cases

As indicated above, the interesting cases are where ${\displaystyle 1<k<n/2}$. We list the first few of these:

${\displaystyle n}$	${\displaystyle k}$	Kneser graph ${\displaystyle KG_{n,k}}$
5	2	Petersen graph
6	2	Fill this in later

Odd graph case

A particular case of Kneser graphs of interest is where ${\displaystyle n=2k+1}$. This gives a one-parameter family of graphs called odd graphs. Specifically, the odd graph ${\displaystyle O_{m}}$ is defined as the Kneser graph with ${\displaystyle n=2m-1}$ and ${\displaystyle k=m-1}$.

Arithmetic functions

Size measures

Function	Value	Explanation
size of vertex set	${\displaystyle {\binom {n}{k}}={\frac {n!}{k!(n-k)!}}}$	By definition, it is the number of ${\displaystyle k}$-element subsets of a fixed ${\displaystyle n}$-element set.
size of edge set	${\displaystyle {\frac {1}{2}}{\binom {n}{k,k,n-2k}}={\frac {1}{2}}{\frac {n!}{k!k!(n-2k)!}}}$	This is the number of ways of dividing a set of size ${\displaystyle n}$ into two interchangeable substs of size ${\displaystyle k}$ and a left-over set of size ${\displaystyle n-2k}$.

Numerical invariants associated with vertices

We restrict attention to the case that ${\displaystyle 1\leq k<n/2}$ for the expressions below.

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	${\displaystyle {\binom {n-k}{k}}}$	We need to determine, for a given ${\displaystyle k}$-element subset, the number of ${\displaystyle k}$-element subsets disjoint from it. This is the same as the number of ${\displaystyle k}$-element subsets of its set-theoretic complement, which has size ${\displaystyle n-k}$.
eccentricity of a vertex	${\displaystyle 1+\left\lceil {\frac {k-1}{n-2k}}\right\rceil }$ where ${\displaystyle \lceil \rceil }$ denotes the ceiling function: the smallest integer greater than or equal to a given number

Other numerical invariants

We restrict attention to the case ${\displaystyle 1\leq k<n/2}$ for all the formulas below, though some of the formulas are also more generally valid.

Function	Value	Explanation
clique number	${\displaystyle \left\lfloor {\frac {n}{k}}\right\rfloor }$ where ${\displaystyle \lfloor \rfloor }$ is the floor function (the greatest integer function) that returns the largest integer less than or equal to the number	For a subset of the vertex set to form a clique, the elements of the subset must be disjoint as subsets of the ${\displaystyle n}$-element set. If there are ${\displaystyle r}$ such subsets, they have a total of ${\displaystyle kr}$ elements, forcing ${\displaystyle kr\leq n}$, giving the upper bound. It's also easy to see that this upper bound is achieved.
independence number	Fill this in later
chromatic number	${\displaystyle n-2k+2}$ if ${\displaystyle k\leq n/2}$ 1 otherwise
radius of a graph	${\displaystyle 1+\left\lceil {\frac {k-1}{n-2k}}\right\rceil }$ where ${\displaystyle \lceil \rceil }$ denotes the ceiling function: the smallest integer greater than or equal to a given number	Due to vertex-transitivity, the radius equals the eccentricity of any vertex, which has been computed above.
diameter of a graph	${\displaystyle 1+\left\lceil {\frac {k-1}{n-2k}}\right\rceil }$ where ${\displaystyle \lceil \rceil }$ denotes the ceiling function: the smallest integer greater than or equal to a given number	Due to vertex-transitivity, the diameter equals the eccentricity of any vertex, which has been computed above.
odd girth	${\displaystyle 1+2\left\lceil {\frac {k}{n-2k}}\right\rceil }$ where ${\displaystyle \lceil \rceil }$ denotes the ceiling function: the smallest integer greater than or equal to a given number
even girth	6 if ${\displaystyle n=2k+1}$ 4 if ${\displaystyle n\geq 2k+2}$