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On subclasses of analytic functions based on a quantum symmetric conformable differential operator with application

Rabha W. Ibrahim, Rafida M. Elobaid, Suzan J. Obaiys

2020Advances in Difference Equations11 citationsDOIOpen Access PDF

Abstract

Abstract Quantum calculus (the calculus without limit) appeared for the first time in fluid mechanics, noncommutative geometry and combinatorics studies. Recently, it has been included into the field of geometric function theory to extend differential operators, integral operators, and classes of analytic functions, especially the classes that are generated by convolution product (Hadamard product). In this effort, we aim to introduce a quantum symmetric conformable differential operator (Q-SCDO). This operator generalized some well-know differential operators such as Sàlàgean differential operator. By employing the Q-SCDO, we present subclasses of analytic functions to study some of its geometric solutions of q -Painlevé differential equation (type III).

Topics & Concepts

MathematicsQuantum differential calculusParametrixDifferential operatorNoncommutative geometryPseudo-differential operatorPure mathematicsFourier integral operatorDifferential calculusDifferential geometryOperator (biology)Semi-elliptic operatorAnalytic functionOperator theoryAlgebra over a fieldMathematical analysisHypoelliptic operatorNoncommutative quantum field theoryBiochemistryRepressorTranscription factorGeneChemistryAnalytic and geometric function theoryNonlinear Waves and SolitonsMathematical functions and polynomials
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