On some properties of the Mittag-Leffler function Eα(-tα), completely monotone for t > 0 with 0 < α < 1

Abstract

We analyse some peculiar properties of the function of the Mittag-Leffler (M-L) type, eα(t):= Eα(-tα) for 0 <α < 1 and t > 0, which is known to be completely monotone (CM) with a non negative spectrum of frequencies and times, suitable to model fractional relaxation processes. We first note that these two spectra coincide so providing a universal scaling property of this function. Furthermore, we consider the problem of approximating our M-L function with simpler CM functions for small and large times. We provide two different sets of elementary CM functions that are asymptotically equivalent to eα(t) as t 0 and t ∞.