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Some Janowski Type Harmonic q-Starlike Functions Associated with Symmetrical Points

Muhammad Arif, Omar Barkub, H. M. Srivastava, Saleem Abdullah, Sher Khan

2020Mathematics43 citationsDOIOpen Access PDF

Abstract

The motive behind this article is to apply the notions of q-derivative by introducing some new families of harmonic functions associated with the symmetric circular region. We develop a new criterion for sense preserving and hence the univalency in terms of q-differential operator. The necessary and sufficient conditions are established for univalency for this newly defined class. We also discuss some other interesting properties such as distortion limits, convolution preserving, and convexity conditions. Further, by using sufficient inequality, we establish sharp bounds of the real parts of the ratios of harmonic functions to its sequences of partial sums. Some known consequences of the main results are also obtained by varying the parameters.

Topics & Concepts

Convolution (computer science)ConvexityMathematicsHarmonicDistortion (music)Type (biology)Class (philosophy)Pure mathematicsDifferential (mechanical device)Operator (biology)Differential operatorHarmonic functionSequence (biology)Mathematical analysisComputer sciencePhysicsTelecommunicationsFinancial economicsEcologyArtificial intelligenceTranscription factorChemistryBandwidth (computing)Machine learningArtificial neural networkQuantum mechanicsRepressorAmplifierGeneticsGeneBiochemistryBiologyThermodynamicsEconomicsAnalytic and geometric function theory
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