The Fractional Model of Spring Pendulum: New Features Within Different Kernels
No Thumbnail Available
Date
2018
Journal Title
Journal ISSN
Volume Title
Publisher
Editura Academiei Romane
Open Access Color
OpenAIRE Downloads
OpenAIRE Views
Abstract
In this work, new aspects of the fractional calculus (FC) are examined for a model of spring pendulum in fractional sense. First, we obtain the classical Lagrangian of the model, and as a result, we derive the classical Euler-Lagrange equations of the motion. Second, we generalize the classical Lagrangian to fractional case and derive the fractional Euler-Lagrange equations in terms of fractional derivatives with singular and nonsingular kernels, respectively. Finally, we provide the numerical solution of these equations within two fractional operators for some fractional orders and initial conditions. Numerical simulations verify that taking into account the recently features of the FC provides more realistic models demonstrating hidden aspects of the real-world phenomena.
Description
Keywords
Spring Pendulum, Euler-Lagrange Equation, Fractional Derivative, Nonsingular Kernel
Turkish CoHE Thesis Center URL
Fields of Science
Citation
Baleanu, Dumitru; Asad, Jihad H.; Jajarmi, Amin, "The Fractional Model of Spring Pendulum: New Features Within Different Kernels", Proceedings of the Romanian Academy Series A-Mathematics Physics Technical Sciences Information Science, Vol. 19, No. 3, pp. 447-454, (2018)
WoS Q
Scopus Q
Source
Proceedings of the Romanian Academy Series A-Mathematics Physics Technical Sciences Information Science
Volume
19
Issue
3
Start Page
447
End Page
454