中文

Minimal Lagrangian surfaces in the two-dimensional complex hyperbolic quadric via the loop group method

微分几何 2026-05-19 v1

摘要

We study minimal Lagrangian surfaces in the complex hyperbolic quadric. We show that minimality of a Lagrangian surface is characterized by a loop of flat connections, which yields an associated S1\mathbb S^1-family of isometric deformations. We also establish a correspondence with spacelike maximal surfaces in anti-de Sitter 33-space via the Gauss map. Using the resulting harmonic map into the hyperbolic two-space, we develop a DPW-type representation and construct explicit examples, including R\mathbb{R}-equivariant and radially symmetric surfaces. In particular, under suitable conditions, the R\mathbb{R}-equivariant family contains catenoid-type examples.

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引用

@article{arxiv.2605.17876,
  title  = {Minimal Lagrangian surfaces in the two-dimensional complex hyperbolic quadric via the loop group method},
  author = {Shimpei Kobayashi and Sihao Zeng},
  journal= {arXiv preprint arXiv:2605.17876},
  year   = {2026}
}