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Autores principales: González-Santander, Juan Luis, Spada, Giorgio, Mainardi, Francesco, Apelblat, Alexander
Formato: Preprint
Publicado: 2024
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Acceso en línea:https://arxiv.org/abs/2408.06369
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author González-Santander, Juan Luis
Spada, Giorgio
Mainardi, Francesco
Apelblat, Alexander
author_facet González-Santander, Juan Luis
Spada, Giorgio
Mainardi, Francesco
Apelblat, Alexander
contents In the framework of the theory of linear viscoelasticity, we derive an analytical expression of the relaxation modulus in the Andrade model $G_{α}\left( t\right) $ for the case of rational parameter \mbox{$α=m/n\in (0,1)$} in terms of Mittag--Leffler functions from its Laplace transform $\tilde{G}_{α}\left( s\right) $. It turns out that the expression obtained can be rewritten in terms of Rabotnov functions. Moreover, for the original parameter $α=1/3$ in the Andrade model, we obtain an expression in terms of Miller-Ross functions. The asymptotic behaviours of $G_{α}\left( t\right) $ for $t\rightarrow 0^{+}$ and $t\rightarrow +\infty $ are also derived applying the Tauberian theorem. The analytical results obtained have been numerically checked by solving the Volterra integral equation satisfied by $G_{α}\left( t\right) $ by using a successive approximation approach, as well as computing the inverse Laplace transform of $\tilde{G}_{α}\left( s\right) $ by using Talbot's method.
format Preprint
id arxiv_https___arxiv_org_abs_2408_06369
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Calculation of the Relaxation Modulus in the Andrade Model by Using the Laplace Transform
González-Santander, Juan Luis
Spada, Giorgio
Mainardi, Francesco
Apelblat, Alexander
Classical Physics
Mathematical Physics
33E12, 44A10, 45D05
In the framework of the theory of linear viscoelasticity, we derive an analytical expression of the relaxation modulus in the Andrade model $G_{α}\left( t\right) $ for the case of rational parameter \mbox{$α=m/n\in (0,1)$} in terms of Mittag--Leffler functions from its Laplace transform $\tilde{G}_{α}\left( s\right) $. It turns out that the expression obtained can be rewritten in terms of Rabotnov functions. Moreover, for the original parameter $α=1/3$ in the Andrade model, we obtain an expression in terms of Miller-Ross functions. The asymptotic behaviours of $G_{α}\left( t\right) $ for $t\rightarrow 0^{+}$ and $t\rightarrow +\infty $ are also derived applying the Tauberian theorem. The analytical results obtained have been numerically checked by solving the Volterra integral equation satisfied by $G_{α}\left( t\right) $ by using a successive approximation approach, as well as computing the inverse Laplace transform of $\tilde{G}_{α}\left( s\right) $ by using Talbot's method.
title Calculation of the Relaxation Modulus in the Andrade Model by Using the Laplace Transform
topic Classical Physics
Mathematical Physics
33E12, 44A10, 45D05
url https://arxiv.org/abs/2408.06369