Polynomial hyperbolicity and products of free groups

Abstract

In this article, we define a locally finite graph X as η-polynomially hyperbolic if there exists a Lipschitz map φ: X Z to some hyperbolic space Z satisfying the following condition: there exists C ≥ 0 such that |B(p,R1) φ-1 (B(q,R2))| ≤ (C R1)η(C R2) for all p,q ∈ X, R1,R2 ≥ 0. The picture to keep in mind is that coarse fibres of φ have polynomial growth with a degree coarsely controlled by η as the thickness of the fibres grows. The map η quantifies how brutal we have to be in order to turn X into a hyperbolic space. Our main result is that, among cocompact special groups, being lin-polynomially hyperbolic amounts not to contain F2 × F2 as a subgroup. Consequently, containing F2 × F2 as a subgroup turns out to be quasi-isometric invariant for cocompact special groups.