The Hitchin component of the character variety of representations of a surface group π 1 (S) into PSL d (R) for some d ≥ 3 can be equipped with a pressure metric whose restriction to the Fuchsian locus equals the Weil-Petersson metric up to a constant factor. We show that if the genus of S is at least 3, then the Fuchsian locus contains quasi-convex subsets of infinite diameter for the Weil-Petersson metric whose diameter for the path metric of the pressure metric is finite. This is established through showing that biinfinite paths of bending deformations have controlled bounded length. To this end we give a geometric interpretation of Fock-Goncharov positivity and show that bending deformations of Fuchsian representations stabilize a uniform Finsler quasi-convex disk in the symmetric space PSL d (R)/PSO(d).
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