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Generalized null 2-type immersions in Euclidean space
- Authors
- Lee, Jae Won; Kim, Dong-Soo; Kim, Young Ho; Yoon, Dae Won
- Issue Date
- Jan-2018
- Publisher
- WALTER DE GRUYTER GMBH
- Keywords
- Developable surface; generalized null 2-type immersion; mean curvature vector
- Citation
- ADVANCES IN GEOMETRY, v.18, no.1, pp 27 - 36
- Pages
- 10
- Indexed
- SCIE
SCOPUS
- Journal Title
- ADVANCES IN GEOMETRY
- Volume
- 18
- Number
- 1
- Start Page
- 27
- End Page
- 36
- ISSN
- 1615-715X
1615-7168
- Abstract
- We define generalized null 2-type submanifolds in the m-dimensional Euclidean space E-m. Generalized null 2-type submanifolds are a generalization of null 2-type submanifolds defined by B.-Y. Chen satisfying the condition Delta H = fH + gC for some smooth functions f, g and a constant vector C in E-m, where Delta and H denote the Laplace operator and the mean curvature vector of a submanifold, respectively. We study developable surfaces in E-3 and investigate developable surfaces of generalized null 2-type surfaces. As a result, all cylindrical surfaces are proved to be of generalized null 2-type. Also, we show that planes are the only tangent developable surfaces which are of generalized null 2-type. Finally, we characterize generalized null 2-type conical surfaces.
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