English

Minimal diffeomorphisms with $L^1$ Hopf differentials

Differential Geometry 2024-02-27 v2

Abstract

We prove that for any two Riemannian metrics σ1,σ2\sigma_1, \sigma_2 on the unit disk, a homeomorphism DD\partial\mathbb{D}\to\partial\mathbb{D} extends to at most one quasiconformal minimal diffeomorphism (D,σ1)(D,σ2)(\mathbb{D},\sigma_1)\to (\mathbb{D},\sigma_2) with L1L^1 Hopf differential. For minimal Lagrangian diffeomorphisms between hyperbolic disks, the result is known, but this is the first proof that does not use anti-de Sitter geometry. We show that the result fails without the L1L^1 assumption in variable curvature. The key input for our proof is the uniqueness of solutions for a certain Plateau problem in a product of trees.

Keywords

Cite

@article{arxiv.2310.00778,
  title  = {Minimal diffeomorphisms with $L^1$ Hopf differentials},
  author = {Nathaniel Sagman},
  journal= {arXiv preprint arXiv:2310.00778},
  year   = {2024}
}
R2 v1 2026-06-28T12:37:41.638Z