The space of metric structures on hyperbolic groups

Abstract

We study the metric and topological properties of the space D(G) of left-invariant hyperbolic pseudometrics on the non-elementary hyperbolic group G that are quasi-isometric to a word metric, up to rough similarity. This space naturally contains the Teichm\"uller space in case G is a surface group and the Culler-Vogtmann outer space when G is a free group. Endowed with a natural metric reminiscent of the (symmetrized) Thurston's metric on Teichm\"uller space, we prove that D(G) is an unbounded contractible metric space and that Out(G) acts metrically properly by isometries on it. If we restrict ourselves to the subspace Dδ(G) of the points represented by δ-hyperbolic metrics with critical exponent 1, we prove that it is either empty or proper. We also prove continuity of the Bowen-Margulis map from Dδ(G) into the space PCurr(G) of projective geodesic currents on G, extending similar results for surface and free groups, and the continuity of the (normalized) mean distortion as a function on D(G)× D(G).