Relative Artin motives and the reductive Borel-Serre compactification of a locally symmetric variety

Abstract

We introduce the notion of Artin motives and cohomological motives over a scheme X. Given a cohomological motive M over X, we construct its punctual weight zero part ω0X(M) as the universal Artin motive mapping to M. We use this to define a motive EX over X which is an invariant of the singularities of X. The first half of the paper is devoted to the study of the functors ω0X and the computation of the motives EX. In the second half of the paper, we develop the application to locally symmetric varieties. Specifically, let Y be a locally symmetric variety and denote by p:W-->Z the projection of its reductive Borel-Serre compactification W onto its Baily-Borel Satake compactification Z. We show that Rp*(W) is naturally isomorphic to the Betti realization of the motive EZ, where Z is viewed as a scheme. In particular, the direct image of EZ along the projection of Z to Spec(C) gives a motive whose Betti realization is naturally isomorphic to the cohomology of W.