Abstract
By making use of different techniques given in Miller and Mocanu (2000) (and also in Jack (1971)), some recent results consisting of certain multivalently analytic functions given both in Irmak (2005) and in Irmak (2010) are firstly restated and some of their applications are then pointed out.
Highlights
By making use of different techniques given in Miller and Mocanu (2000) (and in Jack (1971)), some recent results consisting of certain multivalently analytic functions given both in Irmak (2005) and in Irmak (2010) are firstly restated and some of their applications are pointed out
For some useful implications of the main results, there is a need to recall certain well-known definitions relating to geometric function theory
The main results include fractional calculus and the main purpose of using fractional calculus is to extend the scope of the main results and to reveal certain complex inequalities which can be associated with geometric function theory
Summary
By making use of different techniques given in Miller and Mocanu (2000) (and in Jack (1971)), some recent results consisting of certain multivalently analytic functions given both in Irmak (2005) and in Irmak (2010) are firstly restated and some of their applications are pointed out. Which are analytic and multivalent in the open unit disk U = {z : z ∈ C and |z| < 1}, where C is the set of complex numbers. For some useful implications of the main results, there is a need to recall certain well-known definitions relating to geometric function theory.
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