Weingarten map of the hypersurface in 4-dimensional Euclidean space and its applications
classification
🧮 math.GM
keywords
hypersurfacetheorycurvatureeuclideanmethodspacetakingweingarten
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In this paper, by taking into account the beginning of the hypersurface theory in Euclidean space $E^4$, a practical method for the matrix of the Weingarten map (or the shape operator) of an oriented hypersurface $M^3$ in $E^4$ is obtained. By taking this efficient method, it is possible to study of the hypersurface theory in $E^4$ which is analog the surface theory in $E^3$. Furthermore, the Gaussian curvature, mean curvature, fundamental forms and Dupin indicatrix of $M^3$ is introduced.
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