On Hodge--Witt cohomology of Drinfeld's upper half space over a finite field

Abstract

In this dissertation we study the Hodge-Witt cohomology of the d-dimensional Drinfeld's upper half space X ⊂ Pkd over a finite field k. We consider the natural action of the k-rational points G of the linear group GLd+1 on H0(X,WnPkdi), making them natural Wn(k)[G]-modules. To study these representations, we introduce a theory of differential operators over the Witt vectors for smooth k-schemes X, through a quasi-coherent sheaf of Wn(k)-algebras DWn(X). We apply this theory to equip suitable local cohomology groups arising from H0(X,WnOPkd) with a (Pkd,DWn(Pkd))-module structure. Those local cohomology groups are naturally modules over some parabolic subgroup of GLd+1(k), and we prove that they are finitely generated (Pkd,DWn(Pkd))-modules.