On the Laplace transform of the Fr\'echet distribution

Abstract

We calculate exactly the Laplace transform of the Fr\'echet distribution in the form γ x-(1+γ) (-x-γ), γ > 0, 0 ≤ x < ∞, for arbitrary rational values of the shape parameter γ, i.e. for γ = l/k with l, k = 1,2, …. The method employs the inverse Mellin transform. The closed form expressions are obtained in terms of Meijer G functions and their graphical illustrations are provided. A rescaled Fr\'echet distribution serves as a kernel of Fr\'echet integral transform. It turns out that the Fr\'echet transform of one-sided L\'evy law reproduces the Fr\'echet distribution.