Relaxation and Oscillation Model Using Caputo Fractional Differential Equations

Wildy Ardan; Siti Fatimah; Kartika Yulianti

doi:10.15575/kubik.v7i2.17929

Relaxation and Oscillation Model Using Caputo Fractional Differential Equations

Wildy Ardan⁽¹⁾, Siti Fatimah⁽²⁾, Kartika Yulianti^(3*)

(1) Indonesia University of Education, Indonesia
(2) Indonesia University of Education, Indonesia
(3) Indonesia University of Education, Indonesia
(*) Corresponding Author

Abstract

The phenomenon of relaxation and oscillation is a common event that is often encountered. Both of these properties can occur in viscoelastic materials even though they do not occur simultaneously. Because the characteristics of viscoelastic materials are difficult to describe using classical-order differential equations, in this study, fractional-order differential equations were used to model each of the relaxation and oscillation phenomena in viscoelastic materials with the help of Laplace transform as a solution method . The solution obtained characterizes the phenomenon of memory effect as well as viscoelastic materials in general. In addition to this phenomenon, several other variables were also found to be the influence of the related material motion dynamics.

Keywords

Caputo fractional derivative, fractional derivative, oscillation, relaxation, viscoelastic

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References

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DOI: https://doi.org/10.15575/kubik.v7i2.17929

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Relaxation and Oscillation Model Using Caputo Fractional Differential Equations

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