There are several Teichmuller spaces associated to a surface of infinite topological type, after the choice of a particular basepoint (a complex or a hyperbolic structure on the surface). Such spaces include the quasiconformal Teichmuller space, the length spectrum Teichmuller space, the Fenchel-Nielsen Teichmuller space, and there are others. In general, these spaces are set-theoretically different. An important question is therefore to understand relations between them. Each of these spaces is equipped with its own metric, and under some hypotheses, there are inclusions between them. In this paper, we obtain local metric comparison results on these inclusions, namely, we show that the inclusions are locally bi-Lipschitz under certain hypotheses. To obtain these results, we use some hyperbolic geometry estimates that give new results also for surfaces of finite type. We recall that in the case of a surface of finite type, all these Teichmuller spaces coincide setwise. In the case of a surface of finite type with no boundary components (but possibly with punctures), we show that the restriction of the identity map to any thick part of Teichmuller space is globally bi-Lipschitz with respect to the length spectrum metric on the domain and the classical Teichmuller metric on the range. In the case of a surface of finite type with punctures and boundary components, there is a metric on the Teichmuller space which we call the arc metric, whose definition is analogous to the length spectrum metric, but which uses lengths of geodesic arcs instead of lengths of closed geodesics. We show that the restriction of the identity map to any "relative thick" part of Teichmuller space is globally bi-Lipschitz, with respect to any of the three metrics: the length spectrum metric, the Teichmuller metric and the arc metric on the domain and on the range.
