A uniformizable spherical CR structure on a two-cusped hyperbolic 3-manifold
Abstract
Let I1, I2, I3 be the complex hyperbolic (4,4,∞) triangle group. In this paper we give a proof of a conjecture of Schwartz for I1, I2, I3. That is I1, I2, I3 is discrete and faithful if and only if I1I3I2I3 is nonelliptic. When I1I3I2I3 is parabolic, we show that the even subgroup I2 I3, I2I1 is the holonomy representation of a uniformizable spherical CR structure on the two-cusped hyperbolic 3-manifold s782 in SnapPy notation.
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