English

Real hyperbolic hyperplane complements in the complex hyperbolic plane

Differential Geometry 2023-07-31 v2 Algebraic Topology Complex Variables Geometric Topology Metric Geometry

Abstract

This paper studies Riemannian manifolds of the form MSM \setminus S, where M4M^4 is a complete four dimensional Riemannian manifold with finite volume whose metric is modeled on the complex hyperbolic plane CH2\mathbb{C} \mathbb{H}^2, and SS is a compact totally geodesic codimension two submanifold whose induced Riemannian metric is modeled on the real hyperbolic plane H2\mathbb{H}^2. In this paper we write the metric on CH2\mathbb{C} \mathbb{H}^2 in polar coordinates about SS, compute formulas for the components of the curvature tensor in terms of arbitrary warping functions (Theorem 7.1), and prove that there exist warping functions that yield a complete finite volume Riemannian metric on MSM \setminus S whose sectional curvature is bounded above by a negative constant (Theorem 1.1(1)). The cases of MSM \setminus S modeled on HnHn2\mathbb{H}^n \setminus \mathbb{H}^{n-2} and CHnCHn1\mathbb{C} \mathbb{H}^n \setminus \mathbb{C} \mathbb{H}^{n-1} were studied by Belegradek in [Bel12] and [Bel11], respectively. One may consider this work as "part 3" to this sequence of papers.

Keywords

Cite

@article{arxiv.1609.01974,
  title  = {Real hyperbolic hyperplane complements in the complex hyperbolic plane},
  author = {Barry Minemyer},
  journal= {arXiv preprint arXiv:1609.01974},
  year   = {2023}
}

Comments

33 pages, 1 figure. Added Remark 1.3 to discuss the references for Corollary 1.2

R2 v1 2026-06-22T15:42:38.270Z