A Nomizu-van Est theorem in Ekedahl's derived -adic setting

Abstract

A theorem of Nomizu and van Est computes the cohomology of a compact nilmanifold, or equivalently the group cohomology of an arithmetic subgroup of a unipotent linear algebraic group over Q. We prove a similar result for the cohomology of a compact open subgroup of a unipotent linear algebraic group over Q with coefficients in a complex of continuous -adic representations. We work with the triangulated categories defined by Ekedahl which play the role of ``derived categories of continuous -adic representations''. This is motivated by Pink's formula computing the derived direct image of an -adic local system on a Shimura variety in its minimal compactification, and its application to automorphic perverse sheaves on Shimura varieties. The key technical result is the computation of the cohomology with coefficients in a unipotent representation with torsion coefficients by an explicit complex of polynomial cochains which is of finite type.