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On q-Limaçon Functions

Afis Saliu, Kanwal Jabeen, Isra Al-Shbeil, Najla M. Aloraini, Sarfraz Nawaz Malik

2022Symmetry17 citationsDOIOpen Access PDF

Abstract

Very recently, functions that map the open unit disc U onto a limaçon domain, which is symmetric with respect to the real axis in the right-half plane, were initiated in the literature. The analytic characterization, geometric properties, and Hankel determinants of these families of functions were also demonstrated. In this article, we present a q-analogue of these functions and use it to establish the classes of starlike and convex limaçon functions that are correlated with q-calculus. Furthermore, the coefficient bounds, as well as the third Hankel determinants, for these novel classes are established. Moreover, at some stages, the radius of the inclusion relationship for a particular case of these subclasses with the Janowski families of functions are obtained. It is worth noting that many of our results are sharp.

Topics & Concepts

MathematicsAnalytic functionConvex functionComplex planeRegular polygonDomain (mathematical analysis)Pure mathematicsUnit (ring theory)Unit diskRADIUSCharacterization (materials science)Plane (geometry)Mathematical analysisCombinatoricsGeometryComputer sciencePhysicsOpticsComputer securityMathematics educationAnalytic and geometric function theoryHolomorphic and Operator Theory
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