Grassmann graph

Template:Short description Template:Infobox graph

In graph theory, Grassmann graphs are a special class of simple graphs defined from systems of subspaces. The vertices of the Grassmann graph Template:Math are the Template:Mvar-dimensional subspaces of an Template:Mvar-dimensional vector space over a finite field of order Template:Mvar; two vertices are adjacent when their intersection is Template:Math-dimensional.

Many of the parameters of Grassmann graphs are [[Q-analog|Template:Mvar-analogs]] of the parameters of Johnson graphs, and Grassmann graphs have several of the same graph properties as Johnson graphs.

• Template:Math is isomorphic to Template:Math.
• For all Template:Math, the intersection of any pair of vertices at distance Template:Mvar is Template:Math-dimensional.
• The clique number of Template:Math is given by an expression in terms its least and greatest eigenvalues Template:Math and Template:Math:

${\displaystyle \omega (J_q(n,k))=1-\frac{{\lambda }_{\max }}{{\lambda }_{\min }}}$

Template:Citation needed

There is a distance-transitive subgroup of ${\displaystyle \mathrm{Aut}(J_q(n,k))}$ isomorphic to the projective linear group ${\displaystyle \mathrm{P}\mathrm{\Gamma }\mathrm{L}(n,q)}$.Template:Citation needed

In fact, unless ${\displaystyle n=2k}$ or ${\displaystyle k\in \{1,n-1\}}$, ${\displaystyle \mathrm{Aut}(J_q(n,k))\cong \mathrm{P}\mathrm{\Gamma }\mathrm{L}(n,q)}$; otherwise ${\displaystyle \mathrm{Aut}(J_q(n,k))\cong \mathrm{P}\mathrm{\Gamma }\mathrm{L}(n,q)\times C_2}$ or ${\displaystyle \mathrm{Aut}(J_q(n,k))\cong \mathrm{Sym}([n{]}_q)}$ respectively.^[1]

As a consequence of being distance-transitive, ${\displaystyle J_q(n,k)}$ is also distance-regular. Letting ${\displaystyle d}$ denote its diameter, the intersection array of ${\displaystyle J_q(n,k)}$ is given by ${\displaystyle \{b_0,\dots ,b_{d-1};c_1,\dots c_d\}}$ where:

• ${\displaystyle b_j:=q^{2j+1}[k-j{]}_q[n-k-j{]}_q}$ for all ${\displaystyle 0\le j<d}$.
• ${\displaystyle c_j:=([j{]}_q{)}^2}$ for all ${\displaystyle 0<j\le d}$.

• The characteristic polynomial of ${\displaystyle J_q(n,k)}$ is given by

${\displaystyle \phi (x):=\prod _{j=0}^{\mathrm{diam}(J_q(n,k))}{(x-(q^{j+1}[k-j{]}_q[n-k-j{]}_q-[j{]}_q))}^{({{\displaystyle (\genfrac{}{}{0ex}{}{n}{j})}}_q-{{\displaystyle (\genfrac{}{}{0ex}{}{n}{j-1})}}_q)}}$.^[1]

• Grassmannian
• Johnson graph