Complex Hyperbolic Geometry of Chain Links

Abstract

The complex hyperbolic triangle group =4,∞,∞;∞ acting on the complex hyperbolic plane H2 C is generated by complex reflections I1, I2, I3 such that the product I2I3 has order four, the products I3I1, I1I2 are parabolic and the product I1I3I2I3 is an accidental parabolic element. Unexpectedly, the product I1I2I3I2 is a hidden accidental parabolic element. We show that the 3-manifold at infinity of 4,∞,∞;∞ is the complement of the chain link 841 in the 3-sphere. In particular, the quartic cusped hyperbolic 3-manifold S3-841 admits a spherical CR-uniformization. The proof relies on a new technique to show that the ideal boundary of the Ford domain is an infinite-genus handlebody. Motivated by this result and supported by the previous studies of various authors, we conjecture that the chain link Cp is an ancestor of the 3-manifold at infinity of the critical complex hyperbolic triangle group p,q,r;∞, for 3 ≤ p ≤ 9.