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Timothy Budd
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Regarding your second question, explicit expressions are known for the absolute value of the twist parameter $\tau_a$ in term of the lengths $\ell_a$ supplemented with the lengths $\ell'_a$ of certain transverse curves. See for instance equation (5.12) in Andersen, Borot, Charbonnier, Giacchetto, Lewański, Wheeler. On the Kontsevich geometry of the combinatorial Teichmüller space. arXiv:2010.11806. In the case that $\ell_a$, $\tau_a$ are coordinates associated to a curve $\gamma$ that separates two distinct pairs of pants, it allows to solve for $\cosh \tau_a$ in terms of the length $\ell_a$ of $\gamma$, the length $\ell'_a$ of $\delta$ and the lengthlengths of the other four boundaries of the pairs of pants. See Figure 19 in their paper:

enter image description here

Regarding your second question, explicit expressions are known for the absolute value of the twist parameter $\tau_a$ in term of the lengths $\ell_a$ supplemented with the lengths $\ell'_a$ of certain transverse curves. See for instance equation (5.12) in Andersen, Borot, Charbonnier, Giacchetto, Lewański, Wheeler. On the Kontsevich geometry of the combinatorial Teichmüller space. arXiv:2010.11806. In the case that $\ell_a$, $\tau_a$ are coordinates associated to a curve $\gamma$ that separates two distinct pairs of pants, it allows to solve for $\cosh \tau_a$ in terms of the length $\ell_a$ of $\gamma$, the length $\ell'_a$ of $\delta$ and the length of the other boundaries of the pairs of pants. See Figure 19 in their paper:

enter image description here

Regarding your second question, explicit expressions are known for the absolute value of the twist parameter $\tau_a$ in term of the lengths $\ell_a$ supplemented with the lengths $\ell'_a$ of certain transverse curves. See for instance equation (5.12) in Andersen, Borot, Charbonnier, Giacchetto, Lewański, Wheeler. On the Kontsevich geometry of the combinatorial Teichmüller space. arXiv:2010.11806. In the case that $\ell_a$, $\tau_a$ are coordinates associated to a curve $\gamma$ that separates two distinct pairs of pants, it allows to solve for $\cosh \tau_a$ in terms of the length $\ell_a$ of $\gamma$, the length $\ell'_a$ of $\delta$ and the lengths of the other four boundaries of the pairs of pants. See Figure 19 in their paper:

enter image description here

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Timothy Budd
  • 3.9k
  • 1
  • 19
  • 33

Regarding your second question, explicit expressions are known for the absolute value of the twist parameter $\tau_a$ in term of the lengths $\ell_a$ supplemented with the lengths $\ell'_a$ of certain transverse curves. See for instance equation (5.12) in Andersen, Borot, Charbonnier, Giacchetto, Lewański, Wheeler. On the Kontsevich geometry of the combinatorial Teichmüller space. arXiv:2010.11806. In the case that $\ell_a$, $\tau_a$ are coordinates associated to a curve $\gamma$ that separates two distinct pairs of pants, it allows to solve for $\cosh \tau_a$ in terms of the length $\ell_a$ of $\gamma$, the length $\ell'_a$ of $\delta$ and the length of the other boundaries of the pairs of pants. See Figure 19 in their paper:

enter image description here