Mittag-Leffler functions and convex ordering
Abstract
The monotonicity of the Mittag-Leffler function Eα with respect to the parameter α is investigated, via some convex ordering properties for related random variables. In particular, it is shown that the mapping α Eα(xα) decreases on (0,2) for all x> 0, that the mapping α Eα(-xα) decreases on (0,1) for all x 1 and that the mapping α Eα((1+α)x) decreases on (0,1) for all x∈ R. Analogous results are presented for the two parameter Mittag-Leffler functions Eα, β with β α, with an emphasis on the extremal case β =α. Several applications of these results are discussed for Abelian integral equations and subdiffusions.
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