Motion Of A Spherical Particle In A Rotating Parabola Using Fractional Lagrangian
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Date
2017
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Univ Politehnica Bucharest
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Abstract
In this work, the fractional Lagrangian of a particle moving in a rotating parabola is used to obtain the fractional Euler- Lagrange equations of motion where derivatives within it are given in Caputo fractional derivative. The obtained fractional Euler- Lagrange equations are solved numerically by applying the Bernstein operational matrices with Tau method. The results obtained are very good and when the order of derivative closes to 1, they are in good agreement with those obtained in Ref. [10] using Multi step- Differential Transformation Method (Ms-DTM).
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Caputo Fractional Derivatives, Riemann-Liouville Fractional Integral, Particle in a Rotating Parabola, Bernstein Operational Matrices
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Baleanu, Dumitru...et al. (2017). "Motion Of A Spherical Particle In A Rotating Parabola Using Fractional Lagrangian", University Politehnica Of Bucharest Scientific Bulletin-Series A-Applied Mathematics And Physics, Vol. 79, No: 2, pp. 183-192.
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University Politehnica Of Bucharest Scientific Bulletin-Series A-Applied Mathematics And Physics
Volume
79
Issue
2
Start Page
183
End Page
192