Non-arithmeticity of length spectra of subgroups of mapping class groups
Abstract
In this paper, we prove that every non-elementary subgroup of the mapping class group of a surface has non-arithmetic Teichmüller length spectrum. Namely, Teichmüller translation lengths of its pseudo-Anosov elements generate a dense additive subgroup of R. We prove this by introducing the notion of cross-ratios on MF and PMF, and studying its geometric and dynamical properties, despite the lack of negatively curved features of the Teichmüller space nor the conformal geometry on PMF.
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