A Hypersurfaces of Revolution Family in the Five-Dimensional Pseudo-Euclidean Space E25
Yanlin Li, Erhan Güler
Abstract
We present a family of hypersurfaces of revolution distinguished by four parameters in the five-dimensional pseudo-Euclidean space E25. The matrices corresponding to the fundamental form, Gauss map, and shape operator of this family are computed. By utilizing the Cayley–Hamilton theorem, we determine the curvatures of the specific family. Furthermore, we establish the criteria for maximality within this framework. Additionally, we reveal the relationship between the Laplace–Beltrami operator of the family and a 5×5 matrix.
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MathematicsEuclidean geometryEuclidean spaceEuclidean distance matrixOperator (biology)Space (punctuation)Pure mathematicsGaussMatrix (chemical analysis)Mathematical analysisGeometryComputer sciencePhysicsRepressorOperating systemTranscription factorQuantum mechanicsChemistryMaterials scienceGeneComposite materialBiochemistryGeometric Analysis and Curvature FlowsAdvanced Differential Geometry ResearchMathematics and Applications