Frattini subgroups of hyperbolic-like groups

Abstract

We study Frattini subgroups of various generalizations of hyperbolic groups. For any countable group G admitting a general type action on a hyperbolic space S, we show that the induced action of the Frattini subgroup (G) on S has bounded orbits. This implies that (G) is "small" compared to G; in particular, |G:(G)|=∞. In contrast, for any finitely generated non-cyclic group Q with (Q)=\ 1\, we construct an infinite lacunary hyperbolic group L such that L/(L) Q; in particular, the Frattini subgroup of an infinite lacunary hyperbolic group can have finite index. As an application, we obtain the first examples of invariably generated, infinite, lacunary hyperbolic groups.