On the properties of Laplace transform originating from one-sided L\'evy stable laws

Abstract

We consider the conventional Laplace transform of f(x), denoted by L[f(x); p]~~F(p)=∫0∞ e-p x f(x) dx with Re(p) > 0. For 0 < α < 1 we furnish the closed form expressions for the inverse Laplace transforms L-1[F(pα); x] and L-1[pα-1F(pα); x]. In both cases they involve definite integration with kernels which are appropriately rescaled one-sided L\'evy stable probability distribution functions gα(x), 0 < α < 1, x > 0. Since gα(x) are exactly and explicitly known for rational α, i.e. for α = l/k with l, k=1, 2, …, l < k, our results extend the known and tabulated case of α = 1/2 to any rational 0 < α < 1. We examine the integral kernels of this procedure as well as the resulting two kinds of L\'evy integral transformations.