On the integral representations of | (z)|2 and its Fourier transform
Abstract
We derive integral representations in terms of the Macdonald functions for the square modulus s | ( a + i s ) |2 of the Gamma function and its Fourier transform when a<0 and a= -1,-2,… , generalizing known results in the case a>0. This representation is based on a renormalization argument using modified Bessel functions of the second kind, and it applies to the representation of the solutions of the Fokker-Planck equation.
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