Generalized Henneberg stable minimal surfaces
Abstract
We generalize the classical Henneberg minimal surface by giving an infinite family of complete, finitely branched, non-orientable, stable minimal surfaces in . These surfaces can be grouped into subfamilies depending on a positive integer (called the complexity), which essentially measures the number of branch points. The classical Henneberg surface is characterized as the unique example in the subfamily of the simplest complexity , while for multiparameter families are given. The isometry group of the most symmetric example with a given complexity is either isomorphic to the dihedral isometry group (if is odd) or to (if is even). Furthermore, for even is the unique solution to the Bj\"orling problem for a hypocycloid of cusps (if is even), while for odd the conjugate minimal surface to is the unique solution to the Bj\"orling problem for a hypocycloid of cusps.
Cite
@article{arxiv.2207.01099,
title = {Generalized Henneberg stable minimal surfaces},
author = {David Moya and Joaquín Pérez},
journal= {arXiv preprint arXiv:2207.01099},
year = {2022}
}