On Lusztig-Dupont homology of flag complexes

Abstract

Let V be an n-dimensional vector space over the finite field of order q. The spherical building XV associated with GL(V) is the order complex of the nontrivial linear subspaces of V. Let g be the local coefficient system on XV, whose value on the simplex σ=[V0 ⊂ ·s ⊂ Vp] ∈ XV is given by g(σ)=V0. Following the work of Lusztig and Dupont, we study the homology module Dk(V)=Hn-k-1(XV;g). Our results include a construction of an explicit basis of D1(V), and the following twisted analogue of a result of Smith and Yoshiara: For any 1 ≤ k ≤ n-1, the minimal support size of a non-zero (n-k-1)-cycle in the twisted homology Hn-k-1(XV;k g) is (n-k+2)!2.