Teichm\"uller Space Is Totally Geodesic In Goldman Space
Abstract
We construct a new Riemannian metric on Goldman space B(S), the space of the equivalence classes of convex projective structures on the surface S, and then prove the new metric, as well as the metric of Darvishzadeh and Goldman, restricts to be the Weil-Petersson metric on Teichmuller space, embedded as a submanifold of Goldman space B(S). Moreover, Teichmuller space endowed with the Weil-Petersson metric then is totally geodesic in the Riemannian manifold B(S).
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