Publication: Persistent Hall rays for Lagrange spectra at cusps of Riemann surfaces
Persistent Hall rays for Lagrange spectra at cusps of Riemann surfaces
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Artigiani, M., Marchese, L., & Ulcigrai, C. (2020). Persistent Hall rays for Lagrange spectra at cusps of Riemann surfaces. Ergodic Theory and Dynamical Systems, 40, 2017–2072. https://doi.org/10.1017/etds.2018.143
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We study Lagrange spectra at cusps of finite area Riemann surfaces. These spectra are penetration spectra that describe the asymptotic depths of penetration of geodesics in the cusps. Their study is in particular motivated by Diophantine approximation on Fuchsian groups. In the classical case of the modular surface and classical Diophantine approximation, Hall proved in 1947 that the classical Lagrange spectrum contains a half-line, known as a Hall ray. We generalize this result to the context of Riemann surfaces with cusps and Diopha
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- Artigiani, Mauro
- Marchese, Luca
- Ulcigrai, Corinna
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Artigiani, M., Marchese, L., & Ulcigrai, C. (2020). Persistent Hall rays for Lagrange spectra at cusps of Riemann surfaces. Ergodic Theory and Dynamical Systems, 40, 2017–2072. https://doi.org/10.1017/etds.2018.143
