Convolution and Partial Sums of Certain Multivalent Analytic Functions Involving Srivastava–Tomovski Generalization of the Mittag–Leffler Function

Abstract: We derive several properties such as convolution and partial sums of multivalent analytic functions associated with an operator involving Srivastava–Tomovski generalization of the Mittag–Leffler function.

“…In recent years, there has been growing interest in Mittag-Leffler for application problems including, electric network, fluid flow, probability, statistical distribution theory, etc. (see [2,4,8,12,15,19,[22][23][24] and [27] for more information about this function and its applications). Bansal and Prajapat recently investigated geometric characteristics in [5] for the function E α,µ (z) , like starlikeness, convexity and closed to convex.…”

Certain Properties on Meromorphic Functions Defined by a New Linear Operator Involving the Mittag-Leffler Function

“…In recent years, there has been growing interest in Mittag-Leffler for application problems including, electric network, fluid flow, probability, statistical distribution theory, etc. (see [2,4,8,12,15,19,[22][23][24] and [27] for more information about this function and its applications). Bansal and Prajapat recently investigated geometric characteristics in [5] for the function E α,µ (z) , like starlikeness, convexity and closed to convex.…”

Certain Properties on Meromorphic Functions Defined by a New Linear Operator Involving the Mittag-Leffler Function

A Class of Janowski-Type (p,q)-Convex Harmonic Functions Involving a Generalized q-Mittag–Leffler Function