Quaternionic Shape Operator and Rotation Matrix on Ruled Surfaces
Yanlin Li, Abdussamet Çalışkan
Abstract
In this article, we examine the relationship between Darboux frames along parameter curves and the Darboux frame of the base curve of the ruled surface. We derive the equations of the quaternionic shape operators, which can rotate tangent vectors around the normal vector, and find the corresponding rotation matrices. Using these operators, we examine the Gauss curvature and mean curvature of the ruled surface. We explore how these properties are found by the use of Frenet vectors instead of generator vectors. We provide illustrative examples to better demonstrate the concepts and results discussed.
Topics & Concepts
Frenet–Serret formulasMathematicsRuled surfaceRotation matrixRotation (mathematics)TangentGaussian curvatureMathematical analysisSurface (topology)Operator (biology)CurvatureMatrix (chemical analysis)GaussGenerator (circuit theory)Principal curvaturePure mathematicsGeometryMean curvaturePhysicsChemistryTranscription factorBiochemistryComposite materialMaterials scienceQuantum mechanicsPower (physics)GeneRepressorNonlinear Waves and SolitonsAdvanced Differential Geometry ResearchGeometric Analysis and Curvature Flows