Flexibility and degeneracy around a theorem of Thurston
Abstract
We give two flexible and degenerate constructions related to a theorem of Thurston. First, we produce geodesic segments for Thurston's asymmetric metric on Teichm\"uller space T(Sg) that remain geodesics after adding arbitrary -Lipschitz noise to all but one Fenchel-Nielsen coordinate. Then, for all 2 < n ≤ 3g-3 we construct open sets in T(Sg)n for which the limit cones of the corresponding representations in PSL2(R)n are cones over explicit finite-sided polyhedra. Each construction is as degenerate as possible and has applications to the basic structure and local non-rigidity of the involved objects.
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