Your search keyword '"salagean q-differential operator"' showing total 3 results

1. The Properties of Meromorphic Multivalent q-Starlike Functions in the Janowski Domain

Author

Isra Al-Shbeil, Jianhua Gong, Samrat Ray, Shahid Khan, Nazar Khan, and Hala Alaqad

Subjects

Statistics and Probability, Statistical and Nonlinear Physics, quantum (or q-) calculus, q-derivative operator, Sălăgean q-differential operator, meromorphic multivalent q-starlike functions, Janowski functions, Analysis

Abstract

Many researchers have defined the q-analogous of differential and integral operators for analytic functions using the concept of quantum calculus in the geometric function theory. In this study, we conduct a comprehensive investigation to identify the uses of the Sălăgean q-differential operator for meromorphic multivalent functions. Many features of functions that belong to geometrically defined classes have been extensively studied using differential operators based on q-calculus operator theory. In this research, we extended the idea of the q-analogous of the Sălăgean differential operator for meromorphic multivalent functions using the fundamental ideas of q-calculus. With the help of this operator, we extend the family of Janowski functions by adding two new subclasses of meromorphic q-starlike and meromorphic multivalent q-starlike functions. We discover significant findings for these new classes, including the radius of starlikeness, partial sums, distortion theorems, and coefficient estimates.

Published

2023

2. Sharp Coefficient Bounds for a New Subclass of q-Starlike Functions Associated with q-Analogue of the Hyperbolic Tangent Function

Author

Chetan Swarup

Subjects

analytic functions, univalent functions, q-starlike functions, Hankel determinants, q-derivative operator, Zalcman conjecture, Sălăgean q-differential operator, subordination, Physics and Astronomy (miscellaneous), Chemistry (miscellaneous), General Mathematics, Computer Science (miscellaneous)

Abstract

In this study, by making the use of q-analogous of the hyperbolic tangent function and a Sălăgean q-differential operator, a new class of q-starlike functions is introduced. The prime contribution of this study covers the derivation of sharp coefficient bounds in open unit disk U, especially the first three coefficient bounds, Fekete–Szego type functional, and upper bounds of second- and third-order Hankel determinant for the functions to this class. We also use Zalcman and generalized Zalcman conjectures to investigate the coefficient bounds of a newly defined class of functions. Furthermore, some known corollaries are highlighted based on the unique choices of the involved parameters l and q.

Published

2023

3. Hankel and Symmetric Toeplitz Determinants for a New Subclass of q-Starlike Functions

Author

Isra Al-shbeil, Jianhua Gong, Shahid Khan, Nazar Khan, Ajmal Khan, Mohammad Faisal Khan, and Anjali Goswami

Subjects

Statistics and Probability, Statistical and Nonlinear Physics, Analysis, analytic functions, quantum calculus, q-derivative operator, salagean q-differential operator, q-starlike functions, Hankel determinants, Toeplitz matrices

Abstract

This paper considers the basic concepts of q-calculus and the principle of subordination. We define a new subclass of q-starlike functions related to the Salagean q-differential operator. For this class, we investigate initial coefficient estimates, Hankel determinants, Toeplitz matrices, and Fekete-Szegö problem. Moreover, we consider the q-Bernardi integral operator to discuss some applications in the form of some results.

Published

2022