Lu's conjecture for minimal surfaces
Differential Geometry
2026-01-13 v1
Abstract
After Chern's conjecture on the discreteness of the constant scalar curvatures of compact minimal submanifolds in unit spheres , Z. Q. Lu proposed a conjecture regarding the second gap, based on his ingenious refinement of the known first gap theorem. This refinement unifies Simons' first gap theorem for hypersurfaces with the corresponding theorems for high-codimensional submanifolds established by Yau, Shen, Li and Li, among others. In this paper, for arbitrary codimension, we prove Lu's conjecture for minimal 2-spheres, and for any minimal surfaces under some slight inequality conditions about the normal scalar curvature.
Cite
@article{arxiv.2601.07194,
title = {Lu's conjecture for minimal surfaces},
author = {Weiran Ding and Jianquan Ge and Fagui Li and Xize Yang},
journal= {arXiv preprint arXiv:2601.07194},
year = {2026}
}
Comments
21 pages, any comments are welcome!