Simple closed curves, finite covers of surfaces, and power subgroups of Out(Fn)

Abstract

We construct examples of finite covers of punctured surfaces where the first rational homology is not spanned by lifts of simple closed curves. More generally, for any set O ⊂ Fn which is contained in the union of finitely many Aut(Fn)-orbits, we construct finite-index normal subgroups of Fn whose first rational homology is not spanned by powers of elements of O. These examples answer questions of Farb-Hensel, Kent, Looijenga, and Marche. We also show that the quotient of Out(Fn) by the subgroup generated by kth powers of transvections often contains infinite order elements, strengthening a result of Bridson-Vogtmann saying that it is often infinite. Finally, for any set O ⊂ Fn which is contained in the union of finitely many Aut(Fn)-orbits, we construct integral linear representations of free groups that have infinite image and map all elements of O to torsion elements.