Horocyclic products have Y-posets of hyperbolic structures

Abstract

A hyperbolic structure on a group G is a (not necessarily properly discontinuous) cobounded action of G on a Gromov hyperbolic space, considered up to coarsely G-equivariant quasi-isometry. We show that for groups G acting geometrically and positively on a horocyclic product X Y, all hyperbolic structures on G come from the two actions on the factors. The ingredients of the proof include Malcev rigidity and a new ("vertical") boundary of horocyclic products. We also give the first example of a group acting geometrically on a horocyclic product of two mixed millefeuille spaces.