On the homology growth and the 2-Betti numbers of Out(Wn)

Abstract

Let n 3, and let Out(Wn) be the outer automorphism group of a free Coxeter group Wn of rank n. We study the growth of the dimension of the homology groups (with coefficients in any field K) along Farber sequences of finite-index subgroups of Out(Wn). We show that, in all degrees up to n2-1, these Betti numbers grow sublinearly in the index of the subgroup. When K=Q, through L\"uck's approximation theorem, this implies that all 2-Betti numbers of Out(Wn) vanish up to degree n2-1. In contrast, in top dimension equal to n-2, an argument of Gaboriau and No\us implies that the 2-Betti number does not vanish. We also prove that the torsion growth of the integral homology is sublinear. Our proof of these results relies on a recent method introduced by Ab\'ert, Bergeron, Fraczyk and Gaboriau. A key ingredient is to show that a version of the complex of partial bases of Wn has the homotopy type of a bouquet of spheres of dimension n2-1.