Spherical CR uniformization of the magic 3-manifold
Abstract
We show the 3-manifold at infinity of the complex hyperbolic triangle group 3,∞,∞;∞ is the three-cusped "magic" 3-manifold 613. We also show the 3-manifold at infinity of the complex hyperbolic triangle group 3,4,∞;∞ is the two-cusped 3-manifold m295 in the Snappy Census, which is a 3-manifold obtained by Dehn filling on one cusp of 613. In particular, hyperbolic 3-manifolds 613 and m295 admit spherical CR uniformizations. These results support our conjecture that the 3-manifold at infinity of the complex hyperbolic triangle group 3,n,m;∞ is the one-cusped hyperbolic 3-manifold from the "magic" 613 via Dehn fillings with filling slopes (n-2) and (m-2) on the first two cusps of it.
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