Problem 157

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On the closure $\overline T$ of Teichmüller space, consider a continuous parametrization $\overline T \times \Sigma_A^+ \to \mathbb S^2$ such that Image ($t, \Sigma_A^+ = \Lambda(\Gamma_t)$). Is the Hausdorff dimension of $\Lambda(\Gamma_t)$ continuous in $t \in \overline T$?

(Note, this problem was added by the editor to the end of Rufus' last paper [1])


References

  1. [bowen1979hausdorff] Bowen R.  1979.  Hausdorff dimension of quasi-circles. Publications Mathématiques de l'IHÉS. 50:11–25.

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Comments

Don't really understand, but are [1] Sections 8 and 9 relevant?


References

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