Maximum Erdos-Ko-Rado sets of chambers and their antidesigns in vector-spaces of even dimension

Abstract

A chamber of the vector space Fqn is a set \S1,…,Sn-1\ of subspaces of Fqn where S1⊂ S2⊂ …o ⊂ Sn-1 and (Si)=i for i=1,…,n-1. By n(q) we denote the graph whose vertices are the chambers of Fqn with two chambers C1=\S1,…,Sn-1\ and C2=\T1,…,Tn-1\ adjacent in n(q), if Si Tn-i=\0\ for i=1,…,n-1. The Erdos-Ko-Rado problem on chambers is equivalent to determining the structure of independent sets of n(q). The independence number of this graph was determined in [7] for n even and given a subspace P of dimension one, the set of all chambers whose subspaces of dimension n2 contain P attains the bound. The dual example of course also attains the bound. It remained open in [7] whether or not these are all maximum independent sets. Using a description from [6] of the eigenspace for the smallest eigenvalue of this graph, we prove an Erdos-Ko-Rado theorem on chambers of Fqn for sufficiently large q, giving an affirmative answer for n even.