On the connectedness of the boundary of hierarchically hyperbolic spaces

Abstract

We prove that, under a mild assumption, any metrizable compactification of a one-ended proper geodesic metric space is connected. As a consequence, we deduce that the boundary, introduced by Durham--Hagen--Sisto, of a one-ended hierarchically hyperbolic space is connected. Moreover, we prove that the connectedness of the boundary of a hierarchically hyperbolic group is equivalent to the one-endedness of the group. As an application, we show that if, for n≥ 2, G1=A1… An and G2=B1… Bn are free products of one-ended hierarchically hyperbolic groups, then the boundary of G1 is homeomorphic to the boundary of G2 if and only if the boundary of Ai is homeomorphic to the boundary of Bi for 1≤ i≤ n.