Double Covers of Symplectic Dual Polar Graphs

Abstract

Let =(2n,q) be the dual polar graph of type Sp(2n,q). Underlying this graph is a 2n-dimensional vector space V over a field Fq of odd order q, together with a symplectic (i.e. nondegenerate alternating bilinear) form B:V× V Fq. The vertex set of is the set V of all n-dimensional totally isotropic subspaces of V. If q1 mod 4, we obtain from a nontrivial two-graph =(2n,q) on V invariant under PSp(2n,q). This two-graph corresponds to a double cover on which is naturally defined a Q-polynomial (2n+1)-class association scheme on 2| V| vertices.