Vanishing theorems for Shimura varieties at unipotent level

Abstract

We show that the compactly supported cohomology of Shimura varieties of Hodge type of infinite 1(p∞)-level (defined with respect to a Borel subgroup) vanishes above the middle degree, under the assumption that the group of the Shimura datum splits at p. This generalizes and strengthens the vanishing result proved in "Shimura varieties at level 1(p∞) and Galois representations". As an application of this vanishing theorem, we prove a result on the codimensions of ordinary completed homology for the same groups, analogous to conjectures of Calegari--Emerton for completed (Borel--Moore) homology.