Koszul duality for Iwasawa algebras modulo p

Abstract

In this article we establish a version of Koszul duality for filtered rings arising from p-adic Lie groups. Our precise setup is the following. We let G be a uniform pro-p group and consider its completed group algebra =k[\![G]\!] with coefficients in a finite field k of characteristic p. It is known that carries a natural filtration and gr =S(g) where g is the (abelian) Lie algebra of G over k. One of our main results in this paper is that the Koszul dual gr != g can be promoted to an A∞-algebra in such a way that the derived category of pseudocompact -modules D() becomes equivalent to the derived category of strictly unital A∞-modules D∞( g). In the case where G is an abelian group we prove that the A∞-structure is trivial and deduce an equivalence between D() and the derived category of differential graded modules over g which generalizes a result of Schneider for Zp.