FI-modules and the cohomology of modular representations of symmetric groups

Abstract

An FI-module V over a commutative ring k encodes a sequence (Vn)n ≥ 0 of representations of the symmetric groups (Sn)n ≥ 0 over k. In this paper, we show that for a "finitely generated" FI-module V over a field of characteristic p, the cohomology groups Ht(Sn, Vn) are eventually periodic in n. We describe a recursive way to calculate the period and the periodicity range and show that the period is always a power of p. As an application, we show that if M is a compact, connected, oriented manifold of dimension ≥ 2 and confn(M) is the configuration space of unordered n-tuples of distinct points in M then the mod-p cohomology groups Ht(confn(M),k) are eventually periodic in n with period a power of p.