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Loxodromic elements in big mapping class groups via the Hooper-Thurston-Veech construction

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Morales,  Israel
Max Planck Institute for Mathematics, Max Planck Society;

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Valdez,  Ferrán
Max Planck Institute for Mathematics, Max Planck Society;

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Citation

Morales, I., & Valdez, F. (2022). Loxodromic elements in big mapping class groups via the Hooper-Thurston-Veech construction. Algebraic & Geometric Topology, 22(8), 3809-3854. doi:10.2140/agt.2022.22.3809.


Cite as: https://hdl.handle.net/21.11116/0000-000D-4D88-4
Abstract
Let $S$ be an infinite-type surface and $p\in S$. We show that the Thurston-Veech construction for pseudo-Anosov elements, adapted for infinite-type surfaces, produces infinitely many loxodromic elements for the action of $Mod(S;p)$ on the loop graph $L(S;p)$ that do not leave any finite-type subsurface $S'\subset S$ invariant. Moreover, in the language of Bavard-Walker, Thurston-Veech's construction produces loxodromic elements of any weight. As a consequence of Bavard and Walker's work, any subgroup of $Mod(S;p)$ containing two "Thurston-Veech loxodromics" of different weight has an infinite-dimensional space of non-trivial quasimorphisms.