English

Complex Hyperbolic Geometry of Chain Links

Geometric Topology 2024-03-05 v1

Abstract

The complex hyperbolic triangle group Γ=Δ4,,;\Gamma=\Delta_{4,\infty,\infty;\infty} acting on the complex hyperbolic plane HC2{\bf H}^2_{\mathbb C} is generated by complex reflections I1I_1, I2I_2, I3I_3 such that the product I2I3I_2I_3 has order four, the products I3I1I_3I_1, I1I2I_1I_2 are parabolic and the product I1I3I2I3I_1I_3I_2I_3 is an accidental parabolic element. Unexpectedly, the product I1I2I3I2I_1I_2I_3I_2 is a hidden accidental parabolic element. We show that the 3-manifold at infinity of Δ4,,;\Delta_{4,\infty,\infty;\infty} is the complement of the chain link 8148^4_1 in the 3-sphere. In particular, the quartic cusped hyperbolic 3-manifold S3814S^3-8^4_1 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 CpC_p is an ancestor of the 3-manifold at infinity of the critical complex hyperbolic triangle group Δp,q,r;\Delta_{p,q,r;\infty}, for 3p93 \leq p \leq 9.

Keywords

Cite

@article{arxiv.2403.01531,
  title  = {Complex Hyperbolic Geometry of Chain Links},
  author = {Jiming Ma and Baohua Xie and Mengmeng Xu},
  journal= {arXiv preprint arXiv:2403.01531},
  year   = {2024}
}

Comments

30 pages, 13 figures

R2 v1 2026-06-28T15:07:35.308Z