Global Pad\'e approximations of the generalized Mittag-Leffler function and its inverse

Abstract

This paper proposes a global Pad\'e approximation of the generalized Mittag-Leffler function Eα,β(-x) with x∈[0,+∞). This uniform approximation can account for both the Taylor series for small arguments and asymptotic series for large arguments. Based on the complete monotonicity of the function Eα,β(-x), we work out the global Pad\'e approximation [1/2] for the particular cases \0<α<1, β>α\, \0<α=β<1\, and \α=1, β>1\, respectively. Moreover, these approximations are inverted to yield a global Pad\'e approximation of the inverse generalized Mittag-Leffler function -Lα,β(x) with x∈(0,1/(β)]. We also provide several examples with selected values α and β to compute the relative error from the approximations. Finally, we point out the possible applications using our established approximations in the ordinary and partial time-fractional differential equations in the sense of Riemann-Liouville.