I would appreciate if anybody could explain to me with a simple example how to find PDF of a random variable from its characteristic function. Thank you.
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4$\begingroup$ Characteristic function: Inversion formulae $\endgroup$– KasterCommented Sep 16, 2013 at 18:36
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1 Answer
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This is a consequence of Levy's Inversion Formula (aka Fourier Inversion Theorem). If $\varphi$ is the CF of $X$ and $\int_{\mathbb{R}}|\varphi(\theta)|d\theta < \infty$ then $X$ is absolutely continuous with density $$ f(x)= \frac{1}{2\pi}\int_\mathbb{R}e^{-i\theta x}\varphi(\theta)d\theta. $$
(Here we are using the definition $\varphi(\theta) = E[e^{i\theta X}]$, else the constant factor out front might be different.)
Once we know this result it is easy to calculate the density given a CF, just plug into the formula. For example, plug in $\varphi(\theta)= \exp(-\frac12 \theta^2)$ and check that you get $f(x) = \frac{1}{\sqrt{2\pi}}\exp(-\frac12 x^2)$, this is the case of $X \sim N(0,1)$.
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$\begingroup$ Hey , I know comment is quite late , but it would be really helpful if you could tell $ f(x) $ of characteristic function = $( {1- |t|})^{-1}$ $\endgroup$– simranCommented Jun 29, 2023 at 3:52