Grassmann graph | |
---|---|
Named after | Hermann Grassmann |
Vertices | |
Edges | |
Diameter | min(k, n – k) |
Properties | Distance-transitive Connected |
Notation | Jq(n,k) |
Table of graphs and parameters |
In graph theory, Grassmann graphs are a special class of simple graphs defined from systems of subspaces. The vertices of the Grassmann graph Jq(n, k) are the k-dimensional subspaces of an n-dimensional vector space over a finite field of order q; two vertices are adjacent when their intersection is (k – 1)-dimensional.
Many of the parameters of Grassmann graphs are q-analogs of the parameters of Johnson graphs, and Grassmann graphs have several of the same graph properties as Johnson graphs.
Graph-theoretic properties
- Jq(n, k) is isomorphic to Jq(n, n – k).
- For all 0 ≤ d ≤ diam(Jq(n,k)), the intersection of any pair of vertices at distance d is (k – d)-dimensional.
- The clique number of Jq(n,k) is given by an expression in terms its least and greatest eigenvalues λ min and λ max:
Automorphism group
There is a distance-transitive subgroup of isomorphic to the projective linear group .
In fact, unless or , ≅ ; otherwise ≅ or ≅ respectively.[1]
Intersection array
As a consequence of being distance-transitive, is also distance-regular. Letting denote its diameter, the intersection array of is given by where:
- for all .
- for all .
Spectrum
- The characteristic polynomial of is given by
- .[1]