On some inequalities for the two-parameter Mittag-Leffler function in the complex plane
Abstract
For the two-parameter Mittag-Leffler function Eα,β with α > 0 and β 0, we consider the question whether |Eα,β(z)| and Eα,β( z) are comparable on the whole complex plane. We show that the inequality |Eα,β(z)| Eα,β( z) holds globally if and only if Eα,β(-x) is completely monotone on (0,∞). For α∈ [1,2) we prove that the complete monotonicity of 1/Eα,β(x) on (0,∞) is necessary for the global inequality |Eα,β(z)| Eα,β( z), and also sufficient for α =1. For α 2 we show that the absence of non-real zeros for Eα,β is sufficient for the global inequality |Eα,β(z)| Eα,β( z), and also necessary for α =2. All these results have an explicit description in terms of the values of the parameters α,β. Along the way, several inequalities for Eα,β on the half-plane \ z 0\ are established, and a characterization of its log-convexity and log-concavity on the positive half-line is obtained.
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