Sasha Anan'in, Carlos H. Grossi, Jaejeong Lee, João dos Reis jr
Published 2018-01-01Version 1
We study the space $C(a_0,a_1,\dots,a_n)$ of hyperbolic 2-spheres with cone points of prescribed apex curvatures $2a_0,2a_1,\dots,2a_n\in]0,2\pi[$ and some related spaces. For $n=3$, we get a detailed description of such spaces. The euclidean 2-spheres were considered by W. P. Thurston: for $n=4$, the corresponding spaces provide the famous 7 examples of nonarithmetic compact holomorphic 2-ball quotients previously constructed by Deligne-Mostow.
Minimal diffeomorphism between hyperbolic surfaces with cone singularities
Guts and volume for hyperbolic $3$-orbifolds with underlying space $S^3$
Norms on the cohomology of hyperbolic 3-manifolds
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