Asymptotics of high-codimensional area-minimizing currents in hyperbolic space
Differential Geometry
2026-01-14 v2
Abstract
We investigate the asymptotic behavior of high-codimensional area-minimizing locally rectifiable currents in hyperbolic space, addressing a problem posed by F.H. Lin and establishing ``boundary regularity at infinity" results for such currents near their asymptotic boundaries under the standard Euclidean metric. Intrinsic obstructions to high-order regularity arise for odd-dimensional minimal surfaces, revealing a constraint dependent on the geometry of the asymptotic boundary. Our work advances the asymptotic theory of high-codimensional minimal surfaces in hyperbolic space.
Cite
@article{arxiv.2601.04027,
title = {Asymptotics of high-codimensional area-minimizing currents in hyperbolic space},
author = {Xumin Jiang and Jiongduo Xie},
journal= {arXiv preprint arXiv:2601.04027},
year = {2026}
}
Comments
Corrected several typos and revised formula (4.15)