• Corpus ID: 236772202

The Clairaut's theorem on rotational surfaces in pseudo Euclidean 4-space with index 2

@inproceedings{Almaz2021TheCT,
  title={The Clairaut's theorem on rotational surfaces in pseudo Euclidean 4-space with index 2},
  author={Fatma Almaz},
  year={2021}
}
In this paper, Clairaut’s theorem is expressed on the surfaces of rotation in semi Euclidean 4-space. Moreover, the general equations of time-like geodesic curves are characterized according to the results of Clairaut’s theorem on the hyperbolic surfaces of rotation and the elliptic surface of rotation, respectively. 
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The physical approach on the surfaces of rotation in $E_{2}^{4}$
In this paper, some physical expressions as the specific energy and the specific angular momentum on these surfaces of rotation are investigated using conditions being geodesic on rotational surfaces

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