ON CONSTRUCTIONS OF MINIMAL SURFACESON CONSTRUCTIONS OF MINIMAL SURFACES
- Other Titles
- ON CONSTRUCTIONS OF MINIMAL SURFACES
- Authors
- 윤대원
- Issue Date
- 2021
- Publisher
- 충청수학회
- Keywords
- Minimal surface; geodesic; isoparametric surface; marching-scale function.
- Citation
- 충청수학회지, v.34, no.1, pp 1 - 15
- Pages
- 15
- Indexed
- KCI
- Journal Title
- 충청수학회지
- Volume
- 34
- Number
- 1
- Start Page
- 1
- End Page
- 15
- URI
- https://scholarworks.gnu.ac.kr/handle/sw.gnu/4545
- DOI
- 10.14403/jcms.2021.34.1.1
- ISSN
- 1226-3524
2383-6245
- Abstract
- In the recent papers, S anchez-Reyes [Appl. Math. Model. 40 (2016), 1676{1682] descried the method for nding a minimal surface through a geodesic, and Li et al. [Appl. Math Model. 37 (2013), 6415{6424] studied the approximation of minimal surfaces with a geodesic from Dirichlet function. In the present article, we consider an isoparametric surface generated by Frenet frame of a curve introduced by Wang et al. [Comput. Aided Des. 36 (2004), 447-459], and give the necessary and su cient condition to satisfy both geodesic of the curve and minimality of the surface. From this, we construct minimal surfaces in terms of constant curvature and torsion of the curve. As a result, we present a new approach for constructions of the minimal surfaces from a prescribed closed geodesic and unclosed geodesic, and show some new examples of minimal surfaces with a circle and a helix as a geodesic. Our approach can be used in design of minimal surfaces from geodesics.
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