Another point in homological algebra: Duality for discontinuous group actions

Abstract

We consider discontinuous operations of a group G on a contractible n-dimensional manifold X. Let E be a finite dimensional representation of G over a field k of characteristics 0. Let E be the sheaf on the quotient space Y=G X associated to E. Let H!(Y;E) be the image in H(Y;E) of the cohomology with compact support. In the cases where both H!(Y;E) and H!(Y;E*) (E* being the the sheaf associated to the representation dual to E) are finite dimensional, we establish a non-degenerate duality between Hm!(Y;E) and Hn-m!(Y;E). We also show that this duality is compatible with Hecke operators.