Tits Alternative in groups with proper product actions on proper Gromov-hyperbolic spaces

Abstract

In this paper, we study groups with property (PPH), i.e., there exist finitely many proper Gromov-hyperbolic spaces X1,…, Xl on which G acts cocompactly such that the diagonal action of G on the 1-product Πi=1lXi is proper. We show that any finitely generated subgroup of a finitely generated group with property (PPH) either is amenable or contains F2. Furthermore, we study groups with property (PPT), i.e., groups with property (PPH) so that X1,·s,Xl are all proper quasi-trees. We show that any finitely generated subgroup of a finitely generated group with property (PPT) either is virtually (locally-finite)-by-Zn or contains F2. Additionally, we establish that for a non-elementary hyperbolic group \(G\), \(G\) admits a proper diagonal action on a finite product of regular trees if and only if \(G\) has property (PPT). This result transforms a question posed by Button But19 into the problem of whether every non-elementary hyperbolic group has property (PPT).