Rotational Hypersurfaces Satisfying ∆^I R=AR in the Four-Dimensional Euclidean Space

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Politeknik Dergisi
Volume:24 Issue:2
Rotational Hypersurfaces Satisfying ∆^I R=AR in the Four-Dimensional Euclidean Space

Rotational Hypersurfaces Satisfying ∆^I R=AR in the Four-Dimensional Euclidean Space

Pages : 517-520

View : 47 | Download : 13

Publication Date : 2021-06-01

Article Type : Research Paper

Abstract :In this study, rotational hypersurfaces in the 4-dimensional Euclidean space are discussed. Some relations of curvatures of hypersurfaces are given, such as the mean, Gaussian, and their minimality and flatness. In addition, Laplace-Beltrami operator has been defined for 4-dimensional hypersurfaces depending on the first fundamental form. Moreover, it is shown that each element of the 4×4 order matrix A, which satisfies the condition ∆^I R=AR, is zero, that is, the rotational hypersurface R is minimal.
Keywords : Laplace Beltrami operator, rotational hypersurface, 4 dimensional Euclidean space, curvature

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