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Calculate the inverse Laplace transform

$$ \displaystyle{ \mathcal{L^{-1}} \{ s\log \frac{s^2 + a^2}{s^2 - a^2} \} }$$

I know that is boring but I would really appreciate some help.

Thank's in advance!

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    That $s$ at the front suggests something by itself.2012-06-02

1 Answers 1

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I would proceed step by step as follows (using $\risingdotseq$ for the correspondence of the original and image):

$$f\left(x\right)\risingdotseq F=s\log\frac{s^{2}+a^{2}}{s^{2}-a^{2}}$$ $$\int_{0}^{x}f\left(t\right)dt\risingdotseq\frac{F}{s}=\log\frac{s^{2}+a^{2}}{s^{2}-a^{2}}$$ $$-x\int_{0}^{x}f\left(t\right)dt\risingdotseq \frac{d}{ds}\left(\frac{F}{s}\right)=\frac{2s}{s^{2}+a^{2}}-\frac{2s}{s^{2}-a^{2}}$$ $$-x\int_{0}^{x}f\left(t\right)dt\risingdotseq\frac{2s}{s^{2}+a^{2}}-\frac{2s}{s^{2}-a^{2}}$$ inverting the RHS:

$$-x\int_{0}^{x}f\left(t\right)dt=2\cos ax-2\cosh ax \qquad (*)$$ EDIT (thanks to the comment by Fabian): differentiate once with respect to $x$ $$-\int_{0}^{x}f\left(t\right)dt-xf\left(x\right)=-2a\sin ax-2a\sinh2x$$ Now multiply by $x$ and subtract from (*): $$x^2f(x)=2(ax\sin{ax}+ax\sinh{ax}+\cos{ax}-\cosh{ax})$$ $$f(x)=\frac{2}{x^2}(ax\sin{ax}+ax\sinh{ax}+\cos{ax}-\cosh{ax})$$

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    Funny sign `$\risingdotseq$'. Never saw this before. Does it have a conventional meaning?2012-06-02
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    I have already caused confusion in [another question](http://math.stackexchange.com/questions/151336/fracdxdt-lambda-x-epsilon-xt-a-series-solution-via-laplace-method) here. Unfortunately, the textbooks I saw it in are so old that I am unable to find any of them available in preview online2012-06-02
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    By the way, I get a bit confused at the second displayed line after inverting the RHS. Could you explain a bit more?2012-06-03
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    sorry, i should have made a note: it's differentiating wrt $x$2012-06-03
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    why you differentiate twice? How about subtracting $x$ times the first derivative from the original equation?2012-06-03
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    yes, you are right. i was taken off the tangent here2012-06-03
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    @Valentin: Thank you for your reply! I think we can write $-\int_{0}^{x}f\left(t\right)dt=\frac{1}{x}(2\cos ax-2\cosh ax)$ and then getting the derivative on both sides we find $f$.2012-06-03