Homotopy properties of the complex of frames of a unitary space

Abstract

Let V be a finite dimensional vector space equipped with a non-degenerate Hermitian form over a field K. Let G(V) be the graph with vertex set the 1-dimensional non-degenerate subspaces of V and adjacency relation given by orthogonality. We give a complete description of when G(V) is connected in terms of the dimension of V and the size of the ground field K. Furthermore, we prove that if (V) > 4 then the clique complex F(V) of G(V) is simply connected. For finite fields K, we also compute the eigenvalues of the adjacency matrix of G(V). Then by Garland's method, we conclude that Hm(F(V);k) = 0 for all 0≤ m≤ (V)-3, where k is a field of characteristic 0, provided that (V)2 ≤ |K|. Under these assumptions, we deduce that the barycentric subdivision of F(V) deformation retracts to the order complex of the certain rank selection of F(V) which is Cohen-Macaulay over k. Finally, we apply our results to the Quillen poset of elementary abelian p-subgroups of a finite group and to the study of geometric properties of the poset of non-degenerate subspaces of V and the poset of orthogonal decompositions of V.