English

Two optimization problems for the Loewner energy

Complex Variables 2025-01-24 v2 Differential Geometry Geometric Topology Probability

Abstract

A Jordan curve on the Riemann sphere can be encoded by its conformal welding, a circle homeomorphism. The Loewner energy measures how far a Jordan curve is away from being a circle, or equivalently, how far its welding homeomorphism is away from being a M\"obius transformation. We consider two optimizing problems for the Loewner energy, one under the constraint for the curves to pass through nn given points on the Riemann sphere, which is the conformal boundary of hyperbolic 33-space H3\mathbb H^3; the other under the constraint for nn given points on the circle to be welded to another nn given points of the circle. The latter problem can be viewed as optimizing positive curves on the boundary of AdS3^3 space passing through nn prescribed points. We observe that the answers to the two problems exhibit interesting symmetries: optimizing the Jordan curve in H3\partial_\infty \mathbb H^3 gives rise to a welding homeomorphism that is the boundary of a pleated plane in AdS3^3, whereas optimizing the positive curve in  ⁣AdS3\partial_\infty\!\operatorname{AdS}^3 gives rise to a Jordan curve that is the boundary of a pleated plane in H3\mathbb H^3.

Keywords

Cite

@article{arxiv.2402.10054,
  title  = {Two optimization problems for the Loewner energy},
  author = {Yilin Wang},
  journal= {arXiv preprint arXiv:2402.10054},
  year   = {2025}
}

Comments

21 pages, 3 figures. To appear in J. Math. Phys. Special Issue XXIe ICMP congress

R2 v1 2026-06-28T14:49:45.117Z