Hyperbolic actions and 2nd bounded cohomology of subgroups of Out(Fn). Part I: Infinite lamination subgroups

Abstract

In this two part work we prove that for every finitely generated subgroup < Out(Fn), either is virtually abelian or H2b(;R) contains an embedding of 1. The method uses actions on hyperbolic spaces, for purposes of constructing quasimorphisms. Here in Part I, after presenting the general theory, we focus on the case of infinite lamination subgroups - those for which the set of all attracting laminations of all elements of is infinite - using actions on free splitting complexes of free groups.