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While doing an assignment on solving a PDE I stumbled into the following inverse Laplace transform question (involving $\cosh$? I can't believe it). Mathematica gives no solution and I have no idea where to start, and don't know how to use $\mathcal L[f_1\star f_2] = \mathcal L[f_1] \mathcal L[f_2]$, if it's of any help.

$ \mathcal L_{t}^{-1} \left[ \frac{1}{s(s^2+\omega^2)} \frac{\cosh(sx/a)}{\cosh(sl/a)} \right] $

I have to change $s$ back to $t$, which will allow me to finish off this problem. Please share your ideas.

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Usually these require the Residue theorem. The inverse Laplace transform is given by

$\frac{1}{i 2 \pi} \int_{c-i \infty}^{c+i \infty} ds \frac{\exp{(s t)}}{s (s^2 + \omega^2)} \frac{\cosh{(s \frac{x}{a})}}{\cosh{(s \frac{\ell}{a})}} $

where $c$ is a real number such that all of the singularities of the integrand lie to the left.

I will refer you to other posts to view a picture of the contour, which involves a semicircle along the line of integration oriented to the left, enclosing all of the poles of the integrand.

The poles of the integrand here are at $s=0$ and $s = \pm i \omega$. The residues corresponding to these poles (i.e., $\lim_{x \rightarrow p} (x-p) f(x)$ for integrand $f(x)$ and pole $p$) are as follows: $\frac{1}{\omega^2}$ and

$\frac{\exp{(\pm i \omega t)} \cos{(\frac{x}{a})}}{2 \omega^2 \cos{(\frac{\ell}{a})}}$

respectively. Adding the residues up, we get

$\frac{1}{\omega^2} \left( 1 - \frac{\cos{(\frac{x}{a})} \cos{(\omega t)}}{\cos{(\frac{\ell}{a})}} \right ) $

There are also poles resulting from the $\cosh{(s \frac{\ell}{a})}$ term in the integrand at $s=\pm i (2 k+1) (\pi/2) (a/\ell)$ for all integers $k$. The residues from these poles are

$\sum_{k=-\infty}^{\infty} (-1)^{k+1} \frac{\exp{(i (2 k+1) \frac{\pi}{2} \frac{a}{\ell} t)} \cos{((2 k+1) \frac{\pi}{2} \frac{x}{\ell} t)}}{i (2 k+1) \frac{\pi}{2} \frac{a}{\ell} \left ( \omega^2 - (2 k+1)^2 (\frac{\pi}{2} \frac{a}{\ell})^2 \right )} $

$= 2 \sum_{k=0}^{\infty} (-1)^{k+1} \frac{\sin{((2 k+1) \frac{\pi}{2} \frac{a}{\ell} t)} \cos{((2 k+1) \frac{\pi}{2} \frac{x}{\ell} t)}}{(2 k+1) \frac{\pi}{2} \frac{a}{\ell} \left ( \omega^2 - (2 k+1)^2 (\frac{\pi}{2} \frac{a}{\ell})^2 \right )} $

I do not know of a closed-form expression for this latter sum.

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    Oh you're right! And I am reading your answer now.2012-12-27