Acyclic coefficient systems on buildings
Abstract
For cohomological (resp. homological) coefficient systems F (resp. V) on affine buildings X with Coxeter data of type Ad we give for any k1 a sufficient local criterion which implies Hk(X, F)=0 (resp. Hk(X, V)=0). Using this criterion we prove a conjecture of de Shalit on the acyclicity of coefficient systems attached to hyperplane arrangements on the Bruhat-Tits building of the general linear group over a local field. We also generalize an acyclicity theorem of Schneider and Stuhler on coefficient systems attached to representations.
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