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Generalized Null 2-Type Surfaces in Minkowski 3-Spaceopen access
- Authors
- Yoon, Dae Won; Kim, Dong-Soo; Kim, Young Ho; Lee, Jae Won
- Issue Date
- Jan-2017
- Publisher
- MDPI
- Keywords
- flat surface; generalized null 2-type surface; mean curvature vector; B-scroll
- Citation
- SYMMETRY-BASEL, v.9, no.1
- Indexed
- SCIE
SCOPUS
- Journal Title
- SYMMETRY-BASEL
- Volume
- 9
- Number
- 1
- ISSN
- 2073-8994
- Abstract
- For the mean curvature vector field H and the Laplace operator of a submanifold in the Minkowski space, a submanifold satisfying the condition H = fH +gC is known as a generalized null 2-type, where f and g are smooth functions, and C is a constant vector. The notion of generalized null 2-type submanifolds is a generalization of null 2-type submanifolds defined by B.-Y. Chen. In this paper, we study flat surfaces in the Minkowski 3-space L 3 and classify generalized null 2-type flat surfaces. In addition, we show that the only generalized null 2-type null scroll in L 3 is a B-scroll.
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