On the FI-module structure of Hi(n,s)

Abstract

The groups n,s are defined in terms of homotopy equivalences of certain graphs, and are natural generalisations of Out(Fn) and Aut(Fn). They have appeared frequently in the study of free group automorphisms, for example in proofs of homological stability in [8,9] and in the proof that Out(Fn) is a virtual duality group in [1]. More recently, in [5], their cohomology Hi(n,s), over a field of characteristic zero, was computed in ranks n=1, 2 giving new constructions of unstable homology classes of Out(Fn) and Aut(Fn). In this paper we show that, for fixed i and n, this cohomology Hi(n,s) forms a finitely generated FI-module of stability degree n and weight i, as defined by Church-Ellenberg-Farb in [2]. We thus recover that for all i and n, the sequences \Hi(n,s)\s≥0 satisfy representation stability, but with an improved stable range of s ≥ i+n which agrees with the low dimensional calculations made in [5]. Another important consequence of this FI-module structure is the existence of character polynomials which determine the character of the Ss-module Hi(n,s) for all s ≥ i+n. In particular this implies that, for fixed i and n, the dimension of Hi(n,s), is given by a polynomial in s for all s≥ i+n. We compute explicit examples of such character polynomials to demonstrate this phenomenon.