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Can anything be said about the Fourier integral

$\int_{-\infty}^{\infty} \exp\left[ika - (\gamma + ik)^{2/3}\right]dk$

where $a > 0$ and $\gamma > 0$?

Can it be related to some special function? It appears in the physics application described in this MO question.

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Closed form for the case $k=1,\gamma=0$ is not found by Maple 13. –  Gerald Edgar Apr 29 '10 at 12:26
    
He did say gamma > 0. I'm almost positive it converges to a real value when alpha = gamma = 1, as the imaginary part cancels itself out (limit of the imaginary component's integral from -a to a as a goes to infinity is zero, as it's an odd function). I wouldn't be surprised if this was the case for all alpha and gamma. I'll do some more experiments. –  Gabriel Benamy Apr 29 '10 at 13:58
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1 Answer

up vote 2 down vote accepted

upon a change of variables, $\gamma+ik\mapsto ik'$ it takes the form of the generating function of a socalled stable distribution (with stability parameter $\alpha=2/3$ http://en.wikipedia.org/wiki/Stable_distribution

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