English

Spiral Minimal Products

Differential Geometry 2023-11-23 v3

Abstract

This paper exhibits a structural strategy to produce new minimal submanifolds in spheres based on two given ones. The method is to spin the given minimal submanifolds by a curve γS3\gamma\subset \mathbb S^3 in a balanced way and leads to resulting minimal submanifolds - spiral minimal products, which form a two-dimensional family arising from intriguing pendulum phenomena decided by CC and C~\tilde C. With C=0C=0, we generalize the construction of minimal tori in S3\mathbb S^3 explained in [Bre13] to higher dimensional situations. When C=1C=-1, we recapture previous relative work in [CLU06] and [HK12] for special Legendrian submanifolds in spheres, and moreover, can gain numerous C\mathscr C-totally real and totally real embedded minimal submanifolds in spheres and in complex projective spaces respectively. A key ingredient of the paper is to apply a beautiful extension result of minimal submanifolds by Harvey and Lawson [HL75] for a rotational reflection principle in our situation to establish curve γ\gamma.

Keywords

Cite

@article{arxiv.2306.03328,
  title  = {Spiral Minimal Products},
  author = {Haizhong Li and Yongsheng Zhang},
  journal= {arXiv preprint arXiv:2306.03328},
  year   = {2023}
}

Comments

Further improved version (52 pages, 10 figures), to be submitted

R2 v1 2026-06-28T10:57:20.115Z