Minimal surfaces in the three-dimensional sphere with high symmetry

Sheng Bai; Chao Wang; Shicheng Wang

doi:10.1142/S1793525320500132

Minimal surfaces in the three-dimensional sphere with high symmetry

Sheng Bai, Chao Wang, Shicheng Wang

School of Mathematical Sciences

Research output: Contribution to journal › Article › peer-review

Abstract

Using the Lawson existence theorem of minimal surfaces and the symmetries of the Hopf fibration, we will construct symmetric embedded closed minimal surfaces in the three-dimensional sphere. These surfaces contain the Clifford torus, the Lawson's minimal surfaces, and seven new minimal surfaces with genera 9, 25, 49, 121, 121, 361 and 841. We will also discuss the relation between such surfaces and the maximal extendable group actions on subsurfaces of the three-dimensional sphere.

Original language	English
Pages (from-to)	289-317
Number of pages	29
Journal	Journal of Topology and Analysis
Volume	13
Issue number	2
DOIs	https://doi.org/10.1142/S1793525320500132
State	Published - Jun 2021

Keywords

Hopf fibration
Minimal surface
finite group action
spherical geometry
spherical orbifold

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10.1142/S1793525320500132

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title = "Minimal surfaces in the three-dimensional sphere with high symmetry",

abstract = "Using the Lawson existence theorem of minimal surfaces and the symmetries of the Hopf fibration, we will construct symmetric embedded closed minimal surfaces in the three-dimensional sphere. These surfaces contain the Clifford torus, the Lawson's minimal surfaces, and seven new minimal surfaces with genera 9, 25, 49, 121, 121, 361 and 841. We will also discuss the relation between such surfaces and the maximal extendable group actions on subsurfaces of the three-dimensional sphere.",

keywords = "Hopf fibration, Minimal surface, finite group action, spherical geometry, spherical orbifold",

author = "Sheng Bai and Chao Wang and Shicheng Wang",

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PY - 2021/6

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N2 - Using the Lawson existence theorem of minimal surfaces and the symmetries of the Hopf fibration, we will construct symmetric embedded closed minimal surfaces in the three-dimensional sphere. These surfaces contain the Clifford torus, the Lawson's minimal surfaces, and seven new minimal surfaces with genera 9, 25, 49, 121, 121, 361 and 841. We will also discuss the relation between such surfaces and the maximal extendable group actions on subsurfaces of the three-dimensional sphere.

AB - Using the Lawson existence theorem of minimal surfaces and the symmetries of the Hopf fibration, we will construct symmetric embedded closed minimal surfaces in the three-dimensional sphere. These surfaces contain the Clifford torus, the Lawson's minimal surfaces, and seven new minimal surfaces with genera 9, 25, 49, 121, 121, 361 and 841. We will also discuss the relation between such surfaces and the maximal extendable group actions on subsurfaces of the three-dimensional sphere.

KW - Hopf fibration

KW - Minimal surface

KW - finite group action

KW - spherical geometry

KW - spherical orbifold

UR - https://www.scopus.com/pages/publications/85065719238

U2 - 10.1142/S1793525320500132

DO - 10.1142/S1793525320500132

M3 - 文章

AN - SCOPUS:85065719238

SN - 1793-5253

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SP - 289

EP - 317

JO - Journal of Topology and Analysis

JF - Journal of Topology and Analysis

IS - 2

ER -

Minimal surfaces in the three-dimensional sphere with high symmetry

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Keywords

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