An extension of the Thurston metric to projective filling currents
Abstract
We study the geometry of the space of projectivized filling geodesic currents P Cfill(S). Bonahon showed that Teichm\"uller space, T(S) embeds into P Cfill(S). We extend the symmetrized Thurston metric from T(S) to the entire (projectivized) space of filling currents, and we show that T(S) is isometrically embedded into the bigger space. Moreover, we show that there is no quasi-isometric projection back down to T(S). Lastly, we study the geometry of a length-minimizing projection from P Cfill(S) to T(S) defined previously by Hensel and the author.
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