1. The Andrade Model in Linear Viscoelasticity

In the framework of linear viscoelasticity theory, a “transient” phase of deformation occurs right after the elastic response in creep phenomena and is marked by a strain rate that changes over time [1]. Among the rheological laws that exhibit a transient phase, the Andrade model has been effectively used to describe the behavior of various materials. This model was initially introduced by Andrade in 1910 to describe the elongation of metallic wires under constant tensile stress [2]. Its main feature is a transient that exhibits a fractional power function time dependence ∼$t^{\alpha }$. In their empirical stress–strain relationship, Andrade proposed the exponent $\alpha =1/3$ [3]. Nevertheless, later laboratory investigations have shown that values within the range of $0<\alpha <1$ are indeed possible for certain materials [4]. It is worth noting that during the last dozen years, there has been an increasing interest in the Andrade model [5,6]. Using the modern formulation of the Andrade model [7], the creep compliance $J_{\alpha }\left(t\right)$ (i.e., the strain per unit stress) is given by

(1)$J_{\alpha }\left(t\right)=J_U+\beta t^{\alpha }+{\displaystyle \frac{t}{\eta }},t\ge 0,$

(2)$J_U={\displaystyle \frac{1}{\mu }},\beta ={\displaystyle \frac{1}{\mu {\tau }^{\alpha }}},\eta =\mu \tau ,$

(3)$J_{\alpha }\left(t\right)={\displaystyle \frac{1}{\mu }}\left[1+{\left({\displaystyle \frac{t}{\tau }}\right)}^{\alpha }+{\displaystyle \frac{t}{\tau }}\right],t\ge 0,$

It is worth noting that the computation of $G_{\alpha }\left(t\right)$ from $J_{\alpha }\left(t\right)$ is also possible by numerically solving the following Volterra integral equation of the second kind ([9] [Eqn. 2.87]):

(4)$G_{\alpha }\left(t\right)=\mu \left[1-{\int }_0^t{\displaystyle \frac{d{J}_{\alpha }\left(t^{\prime }\right)}{d{t}^{\prime }}}{G}_{\alpha }\left(t-t^{\prime }\right)d{t}^{\prime }\right],$

Next, we derive ${\tilde{G}}_{\alpha }\left(s\right)$ in the Andrade model. For this purpose, apply the Laplace transform to (3) in order to obtain

(5)$\mathcal{L}\left[J_{\alpha }\left(t\right);s\right]={\tilde{J}}_{\alpha }\left(s\right)={\displaystyle \frac{1}{\mu s^2}}\left[s+\mathrm{\Gamma }\left(1+\alpha \right){\tau }^{-\alpha }{s}^{1-\alpha }+{\displaystyle \frac{1}{\tau }}\right].$

However, since the following relation is satisfied in any linear viscoelasticity rheology ([9] [Eqn. 2.8])

(6)${\tilde{J}}_{\alpha }\left(s\right){\tilde{G}}_{\alpha }\left(s\right)={\displaystyle \frac{1}{s^2}},$

(7)${\tilde{G}}_{\alpha }\left(s\right)={\displaystyle \frac{\mu \tau }{s\tau +\mathrm{\Gamma }\left(\alpha +1\right){\left(s\tau \right)}^{1-\alpha }+1}}.$

As mentioned above, the range of values that are interesting for $\alpha$ are between 0 and 1, so we restrict our study to $\alpha \in (0,1)$. It is worth noting that (7) can also be obtained rewriting the Volterra integral Equation (4) in terms of the Laplace convolution product [12], i.e.,

(8)$G_{\alpha }\left(t\right)=\mu \left(1-G_{\alpha }\left(t\right)\ast {\displaystyle \frac{d{J}_{\alpha }\left(t\right)}{dt}}\right),$

The manuscript is organized as follows. In Section 2, we perform the calculation of $G_{\alpha }\left(t\right)$ for $\alpha =1/3$ (as first suggested by Andrade) in terms of Miller-Ross functions. Section 3 generalizes this result for rational $\alpha$ in terms of a finite sum of Mittag–Leffler functions, which in turn can be expressed as a linear combination of Rabotnov functions. It is worth highlighting that although in principle $\alpha$ can be a real number, the value it actually acquires in rheological models is a positive fractional number less than unity. Section 4 calculates the asymptotic behaviour of $G_{\alpha }\left(t\right)$ for $t\to 0^{+}$ and $t\to +\infty$ by using the Tauberian theorem. Section 5 shows some numerical verifications on the expressions of $G_{\alpha }\left(t\right)$ derived in the previous sections, as well as on their asymptotic behaviors. Finally, we collect our conclusions in Section 6.

2. Laplace Inversion in Terms of Miller-Ross Functions for $\mathbf{\alpha }=\mathbf{1}/\mathbf{3}$

Consider in (7) the following change of variables:

(9)$b={\displaystyle \frac{1}{\tau }},c={\displaystyle \frac{\mathrm{\Gamma }\left(\alpha +1\right)}{{\tau }^{\alpha }}},$

(10)${\tilde{G}}_{\alpha }\left(s\right)={\displaystyle \frac{\mu }{b+s+c{s}^{1-\alpha }}}.$

(11)${\tilde{G}}_{1/3}\left(s\right)={\displaystyle \frac{\mu }{b+s+c{s}^{2/3}}},$

(12)$\left(x+y\right)\left(x^2-xy+y^2\right)=x^3+y^3,$

(13)${\displaystyle \frac{1}{\mu }}{\tilde{G}}_{1/3}\left(s\right)=b^2\underset{\tilde{R}\left(s\right)}{\underbrace{{\displaystyle \frac{1}{p\left(s\right)}}}}+2b\underset{\tilde{Q}\left(s\right)=s\tilde{R}\left(s\right)}{\underbrace{s{\displaystyle \frac{1}{p\left(s\right)}}}}+\underset{s\tilde{Q}\left(s\right)}{\underbrace{{\displaystyle \frac{s^2}{p\left(s\right)}}}}-bc\underset{{\tilde{U}}_{2/3}\left(s\right)}{\underbrace{{\displaystyle \frac{s^{2/3}}{p\left(s\right)}}}}-c\underset{s{\tilde{U}}_{2/3}\left(s\right)}{\underbrace{s{\displaystyle \frac{s^{2/3}}{p\left(s\right)}}}}+c^2\underset{{\tilde{U}}_{4/3}\left(s\right)}{\underbrace{{\displaystyle \frac{s^{4/3}}{p\left(s\right)}}}},$

(14)$p\left(s\right)=s^3+\left(3b+c^3\right)s^2+3b^{2}s+b^3=\prod _{k=1}^3\left(s-s_k\right),$

(15)$\begin{array}{c}{\displaystyle s_1=-\frac{1}{3}\left(M-N-L\right),}\hfill \\ {\displaystyle s_2=-\frac{1}{3}\left(M+e^{i\pi /3}N+e^{-i\pi /3}L\right),}\hfill \\ {\displaystyle s_3=-\frac{1}{3}\left(M+e^{-i\pi /3}N+e^{i\pi /3}L\right),}\hfill \end{array}$

(16)$\begin{array}{c}{\displaystyle M=3b+c^3,}\hfill \\ {\displaystyle L=\sqrt[3]{\frac{3}{2}\sqrt{3b^3{c}^6\left(27b+4c^3\right)}-\frac{27}{2}{b}^2{c}^3-9b{c}^6-c^9},}\hfill \\ {\displaystyle N=\frac{\left(6b+c^3\right)c^3}{L}.}\hfill \end{array}$

(17)$\tilde{R}\left(s\right)={\displaystyle \frac{1}{p\left(s\right)}}=\sum _{k=1}^3{\displaystyle \frac{{\alpha }_k}{s-s_k}},{\alpha }_k=\prod _{j\ne k}^3{\displaystyle \frac{1}{s_k-s_j}}.$

(18)$\begin{array}{c}{\displaystyle \sum _{k=1}^3{\alpha }_k=0,}\hfill \\ {\displaystyle \sum _{k=1}^3{\alpha }_k{s}_k=0.}\hfill \end{array}$

(19)$R\left(t\right)={\mathcal{L}}^{-1}\left[\tilde{R}\left(s\right);t\right],$

(20)$Q\left(t\right)={\mathcal{L}}^{-1}\left[\tilde{Q}\left(s\right);t\right]={\mathcal{L}}^{-1}\left[s\tilde{R}\left(s\right);t\right]=R^{\prime }\left(t\right)+R\left(0\right)\delta \left(t\right),$

(21)${\mathcal{L}}^{-1}\left[s\tilde{Q}\left(s\right);t\right]=Q^{\prime }\left(t\right)+Q\left(0\right)\delta \left(t\right)=R^{\prime \prime }\left(t\right)+R^{\prime }\left(0\right){\delta }^{\prime }\left(t\right).$

(22)$U_{\nu }\left(t\right)={\mathcal{L}}^{-1}\left[{\tilde{U}}_{\nu }\left(s\right);t\right]={\mathcal{L}}^{-1}\left[{\displaystyle \frac{s^{\nu }}{p\left(s\right)}};t\right],$

(23)${\mathcal{L}}^{-1}\left[s{\tilde{U}}_{\nu }\left(s\right);t\right]=U_{\nu }^{\prime }\left(t\right)+U_{\nu }\left(0\right)\delta \left(t\right).$

(24)$\begin{array}{ccc}\hfill G_{1/3}\left(t\right)& =& {\mathcal{L}}^{-1}\left[{\tilde{G}}_{1/3}\left(s\right);t\right]\hfill \\ & =& \mu \left\{b^{2}R\left(t\right)+2b\left[R^{\prime }\left(t\right)+R\left(0\right)\delta \left(t\right)\right]+R^{\prime \prime }\left(t\right)+R^{\prime }\left(0\right){\delta }^{\prime }\left(t\right)\right.\hfill \\ & & +\left.bc{U}_{2/3}\left(t\right)-c\left[U_{2/3}^{\prime }\left(t\right)+U_{2/3}\left(0\right)\delta \left(t\right)\right]+c^2{U}_{4/3}\left(t\right)\right\}.\hfill \end{array}$

2.1. Calculation of $R\left(T\right)$

According to (17) and (19), we have

(25)$R\left(t\right)={\mathcal{L}}^{-1}\left[\tilde{R}\left(s\right);t\right]=\sum _{k=1}^3{\alpha }_k{\mathcal{L}}^{-1}\left[{\displaystyle \frac{1}{s-s_k}};t\right]=\sum _{k=1}^3{\alpha }_{k}exp\left(s_{k}t\right),$

(26)$\begin{array}{c}{\displaystyle R^{\prime }\left(t\right)=\sum _{k=1}^3{\alpha }_k{s}_{k}exp\left(s_{k}t\right),}\\ {\displaystyle R^{″}\left(t\right)=\sum _{k=1}^3{\alpha }_k{s}_k^{2}exp\left(s_{k}t\right).}\end{array}$

(27)$\begin{array}{c}{\displaystyle R\left(0\right)=\sum _{k=1}^3{\alpha }_k=0,}\hfill \\ {\displaystyle R^{\prime }\left(0\right)=\sum _{k=1}^3{\alpha }_k{s}_k=0.}\hfill \end{array}$

2.2. Calculation of $U_{\nu }\left(T\right)$

According to (22), (17), and the inverse Laplace transform ([13] [Eqn. 2.1.2(9)])

(28)${\mathcal{L}}^{-1}\left[{\displaystyle \frac{s^{\nu }}{s-a}};t\right]=a^{\nu }{e}^{at}P\left(-\nu ,at\right),$

(29)$P\left(\nu ,x\right)={\displaystyle \frac{\gamma \left(\nu ,x\right)}{\mathrm{\Gamma }\left(\nu \right)}}={\displaystyle \frac{1}{\mathrm{\Gamma }\left(\nu \right)}}{\int }_0^x{z}^{\nu -1}{e}^{-z}dz,$

(30)$\begin{array}{ccc}\hfill U_{\nu }\left(t\right)& =& {\mathcal{L}}^{-1}\left[{\displaystyle \frac{s^{\nu }}{p\left(s\right)}};t\right]\hfill \\ & =& \sum _{k=1}^3{\alpha }_k{\mathcal{L}}^{-1}\left[{\displaystyle \frac{s^{\nu }}{s-s_k}};t\right]\hfill \\ & =& \sum _{k=1}^3{\alpha }_k{s}_k^{\nu }exp\left(s_{k}t\right)P\left(-\nu ,s_{k}t\right).\hfill \end{array}$

(31)$\underset{x\to 0}{lim}{x}^{\nu }P\left(-\nu ,x\right)={\displaystyle \frac{1}{\mathrm{\Gamma }\left(1-\nu \right)}},$

(32)$\begin{array}{ccc}\hfill U_{\nu }\left(0\right)& =& \underset{t\to 0}{lim}{t}^{-\nu }\sum _{k=1}^3{\alpha }_k{\left(s_{k}t\right)}^{\nu }P\left(-\nu ,s_{k}t\right)\hfill \\ & =& \underset{t\to 0}{lim}{\displaystyle \frac{t^{-\nu }}{\mathrm{\Gamma }\left(1-\nu \right)}}\sum _{k=1}^3{\alpha }_k=0.\hfill \end{array}$

(33)${\displaystyle \frac{d}{dt}}\left[e^{at}P\left(-\nu ,at\right)\right]=a\left[e^{at}P\left(-\nu ,at\right)+{\displaystyle \frac{{\left(at\right)}^{-\nu -1}}{\mathrm{\Gamma }\left(-\nu \right)}}\right],$

(34)$\begin{array}{ccc}\hfill U_{\nu }^{\prime }\left(t\right)& =& \sum _{k=1}^3{\alpha }_k{s}_k^{\nu +1}\left[exp\left(s_{k}t\right)P\left(-\nu ,s_{k}t\right)+{\displaystyle \frac{{\left(s_{k}t\right)}^{-\nu -1}}{\mathrm{\Gamma }\left(-\nu \right)}}\right]\hfill \\ & =& \sum _{k=1}^3{\alpha }_k{s}_k^{\nu +1}exp\left(s_{k}t\right)P\left(-\nu ,s_{k}t\right)+{\displaystyle \frac{t^{-\nu -1}}{\mathrm{\Gamma }\left(-\nu \right)}}\sum _{k=1}^3{\alpha }_k\hfill \\ & =& \sum _{k=1}^3{\alpha }_k{s}_k^{\nu +1}exp\left(s_{k}t\right)P\left(-\nu ,s_{k}t\right).\hfill \end{array}$

2.3. Calculation of $G_{1/3}\left(T\right)$

Insert (25)–(34) into (24) to arrive at the following result, after simplification,

(35)$\begin{array}{ccc}& & G_{1/3}\left(t\right)=\mu \sum _{k=1}^3{\alpha }_{k}exp\left(s_{k}t\right)\hfill \\ & & \left\{\left(b+s_k\right)\left[b+s_k-c{s}_k^{2/3}P\left(-{\displaystyle \frac{2}{3}},s_{k}t\right)\right]+c^2{s}_k^{4/3}P\left(-{\displaystyle \frac{4}{3}},s_{k}t\right)\right\},t\ge 0.\hfill \end{array}$

It is worth noting that we can rewrite (35) in terms of the Miller-Ross functions ([9] [Eqn. E.37]), defined as

(36)${\mathrm{E}}_t\left(\nu ,a\right)={\displaystyle \frac{a^{-\nu }{e}^{at}}{\mathrm{\Gamma }\left(\nu \right)}}\gamma \left(\nu ,at\right)=a^{-\nu }{e}^{at}P\left(\nu ,at\right),$

(37)$G_{1/3}^{\mathrm{MR}}\left(t\right)=\mu \sum _{k=1}^3{\alpha }_k\left\{\left(b+s_k\right)\left[\left(b+s_k\right)e^{s_{k}t}-c{\mathrm{E}}_t\left(-{\displaystyle \frac{2}{3}},s_k\right)\right]+c^2{\mathrm{E}}_t\left(-{\displaystyle \frac{4}{3}},s_{k}t\right)\right\},$

3. Laplace Inversion in Terms of Rabotnov Functions

Consider (7) for the case $\alpha ={\displaystyle \frac{m}{n}}\in \mathbb{Q}$,

(38)$0<m<n,n,m\in \mathbb{N},$

(39)${\tilde{G}}_{m/n}\left(r\right)={\displaystyle \frac{\mu \tau }{\underset{p_{n,m}\left(r\right)}{\underbrace{r^n+\mathrm{\Gamma }\left(1+\frac{m}{n}\right)r^{n-m}+1}}}},$

(40)${\displaystyle \frac{1}{p_{n,m}\left(r\right)}}=\sum _{k=1}^n{\displaystyle \frac{1}{p_{n,m}^{\prime }\left(r_k\right)\left(r-r_k\right)}},$

(41)${\tilde{G}}_{m/n}\left(r\right)=\mu \tau \sum _{k=1}^n{\displaystyle \frac{1}{p_{n,m}^{\prime }\left(r_k\right)\left(r-r_k\right)}},$

(42)${\tilde{G}}_{m/n}\left(s\right)=\mu \tau \sum _{k=1}^n{\displaystyle \frac{1}{p_{n,m}^{\prime }\left(r_k\right)\left(s^{1/n}{\tau }^{1/n}-r_k\right)}}.$

(43)$\begin{array}{ccc}\hfill f_{m/n}\left(t\right)& =& {\mathcal{L}}^{-1}\left[{\tilde{G}}_{m/n}\left(s/\tau \right);t\right]\hfill \\ & =& \mu \tau \sum _{k=1}^n{\displaystyle \frac{1}{p_{n,m}^{\prime }\left(r_k\right)}}{\mathcal{L}}^{-1}\left[{\displaystyle \frac{1}{s^{1/n}-r_k}}\right],\hfill \end{array}$

(44)${\mathcal{L}}^{-1}\left[{\displaystyle \frac{s^{\mu -\nu }}{s^{\mu }-a}};t\right]=t^{\nu -1}{\mathrm{E}}_{\mu ,\nu }\left(a{t}^{\mu }\right),$

(45)${\mathrm{E}}_{\alpha ,\beta }\left(z\right)=\sum _{k=0}^{\infty }{\displaystyle \frac{z^k}{\mathrm{\Gamma }\left(\beta +\alpha k\right)}}.$

(46)${\mathcal{L}}^{-1}\left[{\displaystyle \frac{1}{s^{1/n}-a}};t\right]=t^{1/n-1}{\mathrm{E}}_{{\displaystyle \frac{1}{n}},{\displaystyle \frac{1}{n}}}\left(a{t}^{1/n}\right).$

(47)$f_{m/n}\left(t\right)=\mu \tau t^{1/n-1}\sum _{k=1}^n{\displaystyle \frac{{\mathrm{E}}_{\frac{1}{n},\frac{1}{n}}\left(r_k{t}^{1/n}\right)}{p_{n,m}^{\prime }\left(r_k\right)}}.$

(48)${\mathcal{L}}^{-1}\left[\tilde{F}\left(s\right);t\right]=F\left(t\right)\leftrightarrow {\mathcal{L}}^{-1}\left[\tilde{F}\left(as\right);t\right]={\displaystyle \frac{1}{a}}F\left({\displaystyle \frac{t}{a}}\right),$

(49)$G_{m/n}\left(t\right)={\mathcal{L}}^{-1}\left[{\tilde{G}}_{m/n}\left(s\right);t\right]={\displaystyle \frac{1}{\tau }}{f}_{m/n}\left({\displaystyle \frac{t}{\tau }}\right),$

(50)$G_{m/n}\left(t\right)=\mu {\left({\displaystyle \frac{t}{\tau }}\right)}^{1/n-1}\sum _{k=1}^n{\displaystyle \frac{{\mathrm{E}}_{\frac{1}{n},\frac{1}{n}}\left(r_k{\left(t/\tau \right)}^{1/n}\right)}{p_{n,m}^{\prime }\left(r_k\right)}},t\ge 0,$

(51)$p_{n,m}\left(r\right)=r^n+\mathrm{\Gamma }\left(1+{\displaystyle \frac{m}{n}}\right)r^{n-m}+1.$

(52)${\mathrm{R}}_{\nu }\left(\mu ,t\right)=t^{\nu }{\mathrm{E}}_{\nu +1,\nu +1}\left(\mu t^{\nu +1}\right),$

(53)$G_{m/n}\left(t\right)=\mu \sum _{k=1}^n{\displaystyle \frac{{\mathrm{R}}_{1/n-1}\left(r_k,t/\tau \right)}{p_{n,m}^{\prime }\left(r_k\right)}}.$

(54)$G_{1/3}^{\mathrm{R}}\left(t\right)=\mu \sum _{k=1}^3{\displaystyle \frac{{\mathrm{R}}_{-2/3}\left(r_k,t/\tau \right)}{2\mathrm{\Gamma }\left(\frac{4}{3}\right)r_k+3r_k^2}},t\ge 0,$

(55)$r^3+\mathrm{\Gamma }\left({\displaystyle \frac{4}{3}}\right)r^2+1=0,$

(56)$\begin{array}{c}{r}_1\approx -1.40184,\hfill \\ r_2\approx 0.254432-0.805364i,\hfill \\ r_3\approx 0.254432+0.805364i.\hfill \end{array}$

4. Asymptotic Behaviour via Tauberian Theorem

Next, we will obtain the asymptotic behaviour of the relaxation modulus $G_{\alpha }\left(t\right)$ as $t\to 0^{+}$ and as $t\to +\infty$ from its Laplace transform ${\tilde{G}}_{\alpha }\left(s\right)$ by using the following version of the Tauberian theorem, (for other version of the Tauberian theorem, see [16]).

4.1. Asymptotic Behaviour for $T\to +\infty$

We know that the Laplace transform of the relaxation modulus in the Andrade model is (7)

(61)${\tilde{G}}_{\alpha }\left(s\right)={\displaystyle \frac{\mu \tau }{s\tau +\mathrm{\Gamma }\left(\alpha +1\right){\left(s\tau \right)}^{1-\alpha }+1}},\alpha \in \left(0,1\right).$

(62)${\displaystyle \frac{1}{1-x}}=1+x+x^2+\dots ,\left|x\right|<1,$

(63)${\displaystyle \frac{1}{1+x}}\approx 1-x,x\to 0^{+},$

(64)${\tilde{G}}_{\alpha }\left(s\right)\approx \mu \tau \left[1-s\tau -\mathrm{\Gamma }\left(\alpha +1\right){\left(s\tau \right)}^{1-\alpha }\right],s\to 0^{+}.$

(65)${\tilde{G}}_{\alpha }\left(s\right)\approx \mu \tau \left[1-\mathrm{\Gamma }\left(\alpha +1\right){\left(s\tau \right)}^{1-\alpha }\right],s\to 0^{+}.$

(66)$\begin{array}{ccc}\hfill G_{\alpha }\left(t\right)& \approx & \mu \tau {\mathcal{L}}^{-1}\left[1-\mathrm{\Gamma }\left(\alpha +1\right){\left(s\tau \right)}^{1-\alpha };t\right]\hfill \\ \hfill & =& \mu \tau \delta \left(t\right)-\mu {\displaystyle \frac{\mathrm{\Gamma }\left(\alpha +1\right)}{\mathrm{\Gamma }\left(\alpha -1\right)}}{\left({\displaystyle \frac{t}{\tau }}\right)}^{\alpha -2}.\hfill \end{array}$

(67)$G_{\alpha }\left(t\right)\approx \mu \alpha \left(1-\alpha \right){\left({\displaystyle \frac{t}{\tau }}\right)}^{\alpha -2},t\to +\infty .$

(68)$G_{\alpha }\left(t\right)\approx \mu \alpha \left[\left(1-\alpha \right){\left({\displaystyle \frac{t}{\tau }}\right)}^{\alpha -2}-2{\displaystyle \frac{{\mathrm{\Gamma }}^2\left(1+\alpha \right)}{\mathrm{\Gamma }\left(2\alpha -1\right)}}{\left({\displaystyle \frac{t}{\tau }}\right)}^{2\alpha -3}+\dots \right],t\to +\infty .$

(69)$G_{1/3}\left(t\right)\approx {\displaystyle \frac{2}{9}}\mu {\left({\displaystyle \frac{t}{\tau }}\right)}^{-5/3},t\to +\infty .$

(70)${\mathrm{E}}_{\alpha ,\beta }\left(z\right)\approx -\sum _{k=1}^N{\displaystyle \frac{z^{-k}}{\mathrm{\Gamma }\left(\beta -\alpha k\right)}}+O\left({\left|z\right|}^{-N}\right),z\to \infty ,\left|arg\left(-z\right)\right|<\left(1-{\displaystyle \frac{\alpha }{2}}\right)\pi .$

4.2. Asymptotic Behaviour for $T\to 0^{+}$

Rewrite the Laplace transform of the relaxation modulus (61), as follows:

(71)${\tilde{G}}_{\alpha }\left(s\right)={\displaystyle \frac{\mu }{s}}\left[{\displaystyle \frac{1}{1+\mathrm{\Gamma }\left(\alpha +1\right){\left(s\tau \right)}^{-\alpha }+{\left(s\tau \right)}^{-1}}}\right].$

(72)$\underset{y\to +\infty }{lim}{\displaystyle \frac{1+A{y}^{-a}+y^{-1}}{1+A{y}^{-a}}}=\underset{y\to +\infty }{lim}{\displaystyle \frac{y+A{y}^{1-a}+1}{y+A{y}^{1-a}}}=1,$

(73)$1+\mathrm{\Gamma }\left(\alpha +1\right){\left(s\tau \right)}^{-\alpha }+{\left(s\tau \right)}^{-1}\approx 1+\mathrm{\Gamma }\left(\alpha +1\right){\left(s\tau \right)}^{-\alpha },s\to +\infty .$

(74)${\tilde{G}}_{\alpha }\left(s\right)\approx {\displaystyle \frac{\mu }{s}}\left[{\displaystyle \frac{1}{1+\mathrm{\Gamma }\left(\alpha +1\right){\left(s\tau \right)}^{-\alpha }}}\right],s\to +\infty .$

(75)${\displaystyle \frac{1}{1+\frac{1}{z}}}\approx 1-{\displaystyle \frac{1}{z}},z\to +\infty ,$

(76)${\tilde{G}}_{\alpha }\left(s\right)\approx \mu \left[{\displaystyle \frac{1}{s}}-{\displaystyle \frac{\mathrm{\Gamma }\left(\alpha +1\right)}{{\tau }^{\alpha }{s}^{\alpha +1}}}\right],s\to +\infty .$

(77)$G_{\alpha }\left(t\right)\approx \mu {\mathcal{L}}^{-1}\left[{\displaystyle \frac{1}{s}}-{\displaystyle \frac{\mathrm{\Gamma }\left(\alpha +1\right)}{{\tau }^{\alpha }{s}^{\alpha +1}}};t\right],$

(78)$G_{\alpha }\left(t\right)\approx \mu \left[1-{\left({\displaystyle \frac{t}{\tau }}\right)}^{\alpha }\right],t\to 0^{+}.$

(79)$G_{\alpha }\left(t\right)\approx \mu \left[1-{\left({\displaystyle \frac{t}{\tau }}\right)}^{\alpha }+{\displaystyle \frac{{\mathrm{\Gamma }}^2\left(1+\alpha \right)}{\mathrm{\Gamma }\left(2\alpha -1\right)}}{\left({\displaystyle \frac{t}{\tau }}\right)}^{2\alpha }+\dots \right],t\to 0^{+}.$

(80)$G_{1/3}\left(t\right)\approx \mu \left[1-{\left({\displaystyle \frac{t}{\tau }}\right)}^{1/3}\right],t\to 0^{+}.$

As a consistency test, we can obtain (80) from the the expression given in (50) for $G_{m/n}\left(t\right)$ with $m=1$ and $n=3$, and the definition of the Mittag–Leffler Function (45). Furthermore, the asymptotic formula given in (78) can be obtained from the Volterra integral Equation (4). Indeed, taking into account (2) and (3) and performing the change of variables $x=t-t^{\prime }$, this integral equation reads as

(81)$G_{\alpha }\left(t\right)=\mu -{\displaystyle \frac{1}{\tau }}{\int }_0^t\left[1+\alpha {\left({\displaystyle \frac{t-x}{\tau }}\right)}^{\alpha -1}\right]G_{\alpha }\left(x\right)dx,$

(82)$\underset{t\to 0^{+}}{lim}{G}_{\alpha }\left(t\right)=\mu .$

(83)$\begin{array}{ccc}\hfill G_{\alpha }\left(t\right)& \approx & \mu -{\displaystyle \frac{\mu }{\tau }}{\int }_0^t\left[1+\alpha {\left({\displaystyle \frac{t-x}{\tau }}\right)}^{\alpha -1}\right]dx\hfill \\ & =& \mu \left[1-{\displaystyle \frac{t}{\tau }}-{\left({\displaystyle \frac{t}{\tau }}\right)}^{\alpha }\right]\hfill \end{array}$

(84)$G_{\alpha }\left(t\right)\approx \mu \left[1-{\left({\displaystyle \frac{t}{\tau }}\right)}^{\alpha }\right],t\to 0^{+}.$

Figure 1 presents the graph of $G_{1/3}\left(t\right)$ for $\mu =1$ and different values of $\tau$. Figure 2 shows the asymptotic behaviours given in (80) and (69) for $G_{1/3}\left(t\right)$ with $\mu =1$ and $\tau ={\displaystyle \frac{1}{2}}$.

5. Numerical Results

5.1. Volterra Integral Equation

The quadrature formulas to numerically solve the Volterra integral equation [18] that satisfies $G_{\alpha }\left(t\right)$, i.e., Equation (81), fail because from (80), recalling that $\alpha \in \left(0,1\right)$ and $\mu ,\tau >0$, we have that

(85)$\underset{t\to 0^{+}}{lim}{\displaystyle \frac{d{G}_{\alpha }\left(t\right)}{dt}}=-\infty .$

(86)$u\left(t\right)=f\left(t\right)+{\int }_0^{t}K\left(x,t\right)u\left(x\right)dx,$

(87)$u^{\left(0\right)}\left(t\right)=f\left(t\right),$

(88)$u^{\left(j\right)}\left(t\right)=f\left(t\right)+{\int }_0^{t}K\left(x,t\right)u^{\left(j-1\right)}\left(x\right)dx.$

Figure 3 shows the application of this successive approximation method to the solution of (81) (i.e., taking as kernel $K\left(x,t\right)=-{\displaystyle \frac{1}{\tau }}\left[1+\alpha {\left({\displaystyle \frac{t-x}{\tau }}\right)}^{\alpha -1}\right]$, and $f\left(t\right)=\mu$ in (86)), for $\mu =\tau =1$ and $\alpha =1/3$. It is apparent that as the order of approximation increases, we get a better approximation to the analytical solution $G_{1/3}\left(t\right)$ obtained in (37) or (54). Similar graphs are obtained for other rational values of $\alpha \in \left(0,1\right)$ compared to the analytical solution $G_{\alpha }\left(t\right)$ obtained in (50).

Note that this successive approximation method has been successfully applied in Section 4 in order to derive the first order asymptotic formula (78).

5.2. Inverse Laplace Transform

According to our numerical experiments, the relative error between the analytical formulas of $G_{\alpha }\left(t\right)$ and the numerical Laplace inversion of ${\tilde{G}}_{\alpha }\left(s\right)$, never exceeds the value of ${10}^{-9}$ in the time interval $t\in \left[0,5\right]$. Below we present some of these numerical experiments.

Figure 4 shows the relative error ${\mathrm{\Delta }}_{\mathrm{MR}}\left(t\right)$ between $G_{1/3}^{\mathrm{MR}}\left(t\right)$ and $G_{1/3}^{\mathrm{num}}\left(t\right)$, i.e., the numerical Laplace inversion of ${\tilde{G}}_{1/3}\left(s\right)$ using Talbot’s method [20],

(89)${\mathrm{\Delta }}_{\mathrm{MR}}\left(t\right)=\left|1-{\displaystyle \frac{G_{1/3}^{\mathrm{MR}}\left(t\right)}{G_{1/3}^{\mathrm{num}}\left(t\right)}}\right|.$

Figure 5 shows the relative error ${\mathrm{\Delta }}_{\mathrm{R}}\left(t\right)$ between $G_{1/3}^{\mathrm{R}}\left(t\right)$ and $G_{1/3}^{\mathrm{num}}\left(t\right)$,

(90)${\mathrm{\Delta }}_{\mathrm{R}}\left(t\right)=\left|1-{\displaystyle \frac{G_{1/3}^{\mathrm{R}}\left(t\right)}{G_{1/3}^{\mathrm{num}}\left(t\right)}}\right|.$

6. Conclusions

Considering the Andrade model in linear viscoelasticity, we have derived for the first time an analytical expression for the relaxation modulus in the time domain $G_{\alpha }\left(t\right)$ considering a rational parameter $\alpha \in \left(0,1\right)$ in terms of Mittag–Leffler functions (or equivalently, as a linear combination of Rabotnov functions). For the original parameter $\alpha =1/3$ of the Andrade model, we have derived a particular expression for $G_{1/3}\left(t\right)$ in terms of Miller-Ross functions. It turns out that this last expression is numerically more efficient (approximately twice faster) than the equivalent one in terms of Rabotnov functions.

Furthermore, we have obtained the asymptotic behaviour of $G_{\alpha }\left(t\right)$ for $t\to 0^{+}$ and $t\to +\infty$ using the Tauberian theorem. We have derived the same expression for the asymptotic behaviour as $t\to 0^{+}$ by using the Volterra integral equation of the second kind that $G_{\alpha }\left(t\right)$ satisfies.

Finally, numerical computations for particular values of the parameters have been performed in order to verify the analytical solutions obtained. For this purpose, we have used Talbot’s method for the numerical computation of the inverse Laplace transform, and the method of successive approximations for the numerical evaluation of the Volterra integral equation of the second kind.

Footnotes

Disclaimer/Publisher’s Note: The statements, opinions and data contained in all publications are solely those of the individual author(s) and contributor(s) and not of MDPI and/or the editor(s). MDPI and/or the editor(s) disclaim responsibility for any injury to people or property resulting from any ideas, methods, instructions or products referred to in the content.

Enlarge this image.

Figure 1. Graph of [Forumla omitted. See PDF.] for [Forumla omitted. See PDF.].

Enlarge this image.

Figure 2. Asymptotic behaviour of [Forumla omitted. See PDF.] for [Forumla omitted. See PDF.] and [Forumla omitted. See PDF.].

Enlarge this image.

Figure 3. Successive approximations [Forumla omitted. See PDF.] for [Forumla omitted. See PDF.].

Enlarge this image.

Figure 4. Graph of [Forumla omitted. See PDF.] for [Forumla omitted. See PDF.].

Enlarge this image.

Figure 5. Graph of [Forumla omitted. See PDF.] for [Forumla omitted. See PDF.].

References

1. Christensen, R.M. Theory of Viscoelasticity; Courier Corporation: North Chelmsford, MA, USA, 2003.

2. Andrade, E.N.D.C. On the viscous flow in metals, and allied phenomena. Proceedings of the Royal Society of London. Series A, Containing Papers of a Mathematical and Physical Character; Generic: Homebush West, NSW, Australia, 1910; Volume 84, pp. 1-12.

3. Andrade, E.N.D.C. The validity of the t^1/3 law of flow of metals. Philos. Mag.; 1962; 7, pp. 2003-2014. [DOI: https://dx.doi.org/10.1080/14786436208214469]

4. Walterová, M.; Plesa, A.C.; Wagner, F.W.; Breuer, D. Andrade Rheology in Planetary Science. Authorea Preprints. 2023. Available online: https://essopenarchive.org/doi/full/10.22541/essoar.169008299.99203183 (accessed on 25 July 2024).

5. Rosti, J.; Koivisto, J.; Laurson, L.; Alava, M. Fluctuations and scaling in creep deformation. Phys. Rev. Lett.; 2010; 105, 100601. [DOI: https://dx.doi.org/10.1103/PhysRevLett.105.100601] [PubMed: https://www.ncbi.nlm.nih.gov/pubmed/20867504]

6. Pandey, V. Hidden jerk in universal creep and aftershocks. Phys. Rev.; 2023; 107, L022602. [DOI: https://dx.doi.org/10.1103/PhysRevE.107.L022602] [PubMed: https://www.ncbi.nlm.nih.gov/pubmed/36932618]

7. Bagheri, A.; Khan, A.; Al-Attar, D.; Crawford, O.; Giardini, D. Tidal response of Mars constrained from laboratory-based viscoelastic dissipation models and geophysical data. J. Geophys. Res. Planets; 2019; 124, pp. 2703-2727. [DOI: https://dx.doi.org/10.1029/2019JE006015]

8. Castillo-Rogez, J.C.; Efroimsky, M.; Lainey, V. The tidal history of Iapetus: Spin dynamics in the light of a refined dissipation model. J. Geophys. Res. Planets; 2011; 116, E09008. [DOI: https://dx.doi.org/10.1029/2010JE003664]

9. Mainardi, F. Fractional Calculus and Waves in Linear Viscoelasticity: An Introduction to Mathematical Models; World Scientific: Singapore, 2022.

10. Mainardi, F.; Spada, G. On the viscoelastic characterization of the Jeffreys–Lomnitz law of creep. Rheol. Acta; 2012; 51, pp. 783-791. [DOI: https://dx.doi.org/10.1007/s00397-012-0634-x]

11. Cosorzi, A.; Mellini, D.; González-Santander, J.; Spada, G. On the Love numbers of an Andrade planet. Earth Space Sci.; 2024.

12. Apelblat, A. Laplace Transforms and Their Applications; Mathematics Research Developments Series; Nova Science Publishers: Hauppauge, NY, USA, 2012.

13. Prudnikov, A.P.; Brychkov, Y.A.; Marichev, O.I. Integrals and Series: Inverse Laplace Transforms; CRC Press: Boca Raton, FL, USA, 1986; Volume 5.

14. Olver, F.W.J.; Lozier, D.W.; Boisvert, R.F.; Clark, C.W. NIST Handbook of Mathematical Functions; Cambridge University Press: Cambridge, UK, 2010.

15. Oldham, K.B.; Myland, J.; Spanier, J. An Atlas of Functions: With Equator, the Atlas Function Calculator; Springer: Berlin/Heidelberg, Germany, 2009.

16. Sandev, T.; Tomovski, Z. Fractional equations and models. Theory and Applications; Springer Nature Switzerland AG: Cham, Switzerland, 2019.

17. Erdélyi, A.; Magnus, W.; Oberhettinger, F.; Tricomi, F.G. Higher Transcendental Functions; McGraw-Hill: New York, NY, USA, 1955; Volume 3.

18. Rakotch, E. Numerical solution of Volterra integral equations. Numer. Math.; 1972; 20, pp. 271-279. [DOI: https://dx.doi.org/10.1007/BF01407369]

19. Tricomi, F.G. Integral Equations; Courier Corporation: North Chelmsford, MA, USA, 1985; Volume 5.

20. Talbot, A. The accurate numerical inversion of Laplace transforms. IMA J. Appl. Math.; 1979; 23, pp. 97-120. [DOI: https://dx.doi.org/10.1093/imamat/23.1.97]