The Thurston boundary of Teichmuller space and complex of curves
Abstract
Let S be a closed orientable surface with genus g≥ 2. For a sequence i in the Teichm\"uller space of S, which converges to a projective measured lamination [] in the Thurston boundary, we obtain a relation between and the geometric limit of pants decompositions whose lengths are uniformly bounded by a Bers constant L. We also show that this bounded pants decomposition is related to the Gromov boundary of complex of curves.
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