论文信息 - Classification of Surfaces of Coordinate Finite Type in the Lorentz-Minkowski 3-Space

Classification of Surfaces of Coordinate Finite Type in the Lorentz-Minkowski 3-Space

In this paper, we define surfaces of revolution without parabolic points in three-dimensional Lorentz–Minkowski space. Then, we classify this class of surfaces under the condition ΔIIIx=Ax, where ΔIII is the Laplace operator regarding the third fundamental form, and A is a real square matrix of order 3. We prove that such surfaces are either catenoids or surfaces of Enneper, or pseudo spheres or hyperbolic spaces centered at the origin.

Tareq Hamadneh | Hassan Al-Zoubi | Mutaz Al-Sabbagh | Alev Kelleci Akbay

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