Litcius/Paper detail

Some applications of subordination theorems associated with fractional $q$-calculus operator

Wafaa Y. Kota, R. M. El-Ashwah

2022Mathematica Bohemica17 citationsDOIOpen Access PDF

Abstract

Using the operator $\frak{D}_{q,\varrho}^m(\lambda,l)$, we introduce the subclasses $\frak{Y}^{*m}_{q,\varrho}(l,\lambda,\gamma)$ and $\frak{K}^{*m}_{q,\varrho}(l,\lambda,\gamma)$ of normalized analytic functions. Among the results investigated for each of these function classes, we derive some subordination results involving the Hadamard product of the associated functions. The interesting consequences of some of these subordination results are also discussed. Also, we derive integral means results for these classes.

Topics & Concepts

Subordination (linguistics)MathematicsCalculus (dental)Fractional calculusOperator (biology)Pure mathematicsAlgebra over a fieldDiscrete mathematicsApplied mathematicsPhilosophyBiochemistryLinguisticsDentistryTranscription factorChemistryMedicineGeneRepressorAnalytic and geometric function theoryMathematical functions and polynomialsApproximation Theory and Sequence Spaces
Some applications of subordination theorems associated with fractional $q$-calculus operator | Litcius