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Differential Subordination and Superordination Results Using Fractional Integral of Confluent Hypergeometric Function

Alina Alb Lupaş, Georgia Irina Oros

2021Symmetry41 citationsDOIOpen Access PDF

Abstract

Both the theory of differential subordination and its dual, the theory of differential superordination, introduced by Professors Miller and Mocanu are based on reinterpreting certain inequalities for real-valued functions for the case of complex-valued functions. Studying subordination and superordination properties using different types of operators is a technique that is still widely used, some studies resulting in sandwich-type theorems as is the case in the present paper. The fractional integral of confluent hypergeometric function is introduced in the paper and certain subordination and superordination results are stated in theorems and corollaries, the study being completed by the statement of a sandwich-type theorem connecting the results obtained by using the two theories.

Topics & Concepts

Subordination (linguistics)MathematicsHypergeometric functionDifferential (mechanical device)Univalent functionPure mathematicsConfluent hypergeometric functionType (biology)Algebra over a fieldAnalytic functionPhysicsLinguisticsPhilosophyEcologyThermodynamicsBiologyAnalytic and geometric function theoryX-ray Diffraction in CrystallographyPolymer Synthesis and Characterization