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Non-lightlike Bertrand W curves: A new approach by system of differential equations for position vector

Ayşe Yavuz, Melek Erdoğdu

2020AIMS Mathematics12 citationsDOIOpen Access PDF

Abstract

In this study, the characterization of position vectors belonging to non-lightlike Bertrand W curve mate with constant curvature are obtained depending on differentiable functions. The position vector of Bertrand W curve is stated by a linear combination of its Frenet frame with differentiable functions. There exist also different cases for the curve depending on the value of curvature and torsion. The relationships between Frenet apparatuas of these curves are stated separately for each case. Finally, the timelike and spacelike Bertrand curve mate visualized of given curves as examples, separately.

Topics & Concepts

Frenet–Serret formulasTorsion of a curveCurvatureDifferentiable functionTorsion (gastropod)Mathematical analysisPosition (finance)Constant curvatureMathematicsGeometryMean curvatureCenter of curvatureAnatomyMedicineEconomicsFinanceAdvanced Numerical Analysis TechniquesComputer Graphics and Visualization Techniques
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