English

Minimal conformally flat hypersurfaces

Differential Geometry 2017-06-09 v1

Abstract

We study conformally flat hypersurfaces f ⁣:M3\Q4(c)f\colon M^{3} \to \Q^{4}(c) with three distinct principal curvatures and constant mean curvature HH in a space form with constant sectional curvature cc. First we extend a theorem due to Defever when c=0c=0 and show that there is no such hypersurface if H0H\neq 0. Our main results are for the minimal case H=0H=0. If c0c\neq 0, we prove that if f ⁣:M3\Q4(c)f\colon M^{3} \to \Q^{4}(c) is a minimal conformally flat hypersurface with three distinct principal curvatures then f(M3)f(M^3) is an open subset of a generalized cone over a Clifford torus in an umbilical hypersurface \Q3(c~)\Q4(c)\Q^{3}(\tilde c)\subset \Q^4(c), c~>0\tilde c>0, with c~c\tilde c\geq c if c>0c>0. For c=0c=0, we show that, besides the cone over the Clifford torus in \Sf3R4\Sf^3\subset \R^4, there exists precisely a one-parameter family of (congruence classes of) minimal isometric immersions f ⁣:M3R4f\colon M^3 \to \R^4 with three distinct principal curvatures of simply-connected conformally flat Riemannian manifolds.

Keywords

Cite

@article{arxiv.1706.02394,
  title  = {Minimal conformally flat hypersurfaces},
  author = {Carlos do Rei Filho and Ruy Tojeiro},
  journal= {arXiv preprint arXiv:1706.02394},
  year   = {2017}
}

Comments

29 pages

R2 v1 2026-06-22T20:12:27.605Z