Litcius/Paper detail

Certain differential subordination results for univalent functions associated with $ q $-Salagean operators

Ebrahim Amini, Mojtaba Fardi, Shrideh Al‐Omari, Rania Saadeh

2023AIMS Mathematics11 citationsDOIOpen Access PDF

Abstract

<abstract><p>In this paper, we employ the concept of the $ q $-derivative to derive certain differential and integral operators, $ D_{q, \lambda}^{n} $ and $ I_{q, \lambda}^{n} $, resp., to generalize the class of Salagean operators over the set of univalent functions. By means of the new operators, we establish the subclasses $ M^n_{q, \lambda} $ and $ D^n_{q, \lambda} $ of analytic functions on an open unit disc. Further, we study coefficient inequalities for each function in the given classes. Over and above, we derive some properties and characteristics of the set of differential subordinations by following specific techniques. In addition, we study the general properties of $ D_{q, \lambda}^{n} $ and $ I_{q, \lambda}^{n} $ and obtain some interesting differential subordination results. Several results are also derived in some details.</p></abstract>

Topics & Concepts

LambdaSubordination (linguistics)MathematicsUnivalent functionDifferential operatorDifferential (mechanical device)Pure mathematicsFunction (biology)Class (philosophy)Analytic functionSet (abstract data type)Unit diskUnit (ring theory)Discrete mathematicsCombinatoricsPhysicsComputer scienceQuantum mechanicsBiologyEvolutionary biologyMathematics educationLinguisticsProgramming languagePhilosophyArtificial intelligenceThermodynamicsAnalytic and geometric function theory