Your search keyword '"Geometric function theory"' showing total 4 results

1. A Differential Operator Associated with q -Raina Function.

Author

Attiya, Adel A., Ibrahim, Rabha W., Albalahi, Abeer M., Ali, Ekram E., and Bulboacă, Teodor

Subjects

*SYMMETRIC domains, *GEOMETRIC function theory, *DIFFERENTIAL operators, *ANALYTIC functions, *TAYLOR'S series

Abstract

The topics studied in the geometric function theory of one variable functions are connected with the concept of Symmetry because for some special cases the analytic functions map the open unit disk onto a symmetric domain. Thus, if all the coefficients of the Taylor expansion at the origin are real numbers, then the image of the open unit disk is a symmetric domain with respect to the real axis. In this paper, we formulate the q-differential operator associated with the q-Raina function using quantum calculus, that is the so-called Jacksons' calculus. We establish a new subclass of analytic functions in the unit disk by using this newly developed operator. The theory of differential subordination inspired our approach; therefore, we geometrically explore the most popular properties of this new operator: subordination properties, coefficient bounds, and the Fekete-Szegő problem. As special cases, we highlight certain well-known corollaries of our primary findings. [ABSTRACT FROM AUTHOR]

Published

2022

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

Author

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

Subjects

*DIFFERENTIAL operators, *ANALYTIC functions, *GEOMETRIC function theory, *DIFFERENTIAL equations, *FLUID mechanics, *CALCULUS, *COMBINATORICS

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). [ABSTRACT FROM AUTHOR]

Published

2020

3. Symmetric Conformable Fractional Derivative of Complex Variables.

Author

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

Subjects

*SYMMETRIC operators, *COMPLEX variables, *DIFFERENTIAL operators, *DIFFERENTIAL equations, *ANALYTIC functions, *LINEAR operators, *STAR-like functions, *GEOMETRIC function theory

Abstract

It is well known that the conformable and the symmetric differential operators have formulas in terms of the first derivative. In this document, we combine the two definitions to get the symmetric conformable derivative operator (SCDO). The purpose of this effort is to provide a study of SCDO connected with the geometric function theory. These differential operators indicate a generalization of well known differential operator including the Sàlàgean differential operator. Our contribution is to impose two classes of symmetric differential operators in the open unit disk and to describe the further development of these operators by introducing convex linear symmetric operators. In addition, by acting these SCDOs on the class of univalent functions, we display a set of sub-classes of analytic functions having geometric representation, such as starlikeness and convexity properties. Investigations in this direction lead to some applications in the univalent function theory of well known formulas, by defining and studying some sub-classes of analytic functions type Janowski function and convolution structures. Moreover, by using the SCDO, we introduce a generalized class of Briot–Bouquet differential equations to introduce, what is called the symmetric conformable Briot–Bouquet differential equations. We shall show that the upper bound of this class is symmetric in the open unit disk. [ABSTRACT FROM AUTHOR]

Published

2020

4. New Symmetric Differential and Integral Operators Defined in the Complex Domain.

Author

Ibrahim, Rabha W. and Darus, Maslina

Subjects

*DIFFERENTIAL operators, *INTEGRAL operators, *GEOMETRIC function theory, *SYMMETRIC operators, *ISOGEOMETRIC analysis, *BOUNDARY value problems, *SPECTRAL theory

Abstract

The symmetric differential operator is a generalization operating of the well-known ordinary derivative. These operators have advantages in boundary value problems, statistical studies and spectral theory. In this effort, we introduce a new symmetric differential operator (SDO) and its integral in the open unit disk. This operator is a generalization of the Sàlàgean differential operator. Our study is based on geometric function theory and its applications in the open unit disk. We formulate new classes of analytic functions using SDO depending on the symmetry properties. Moreover, we define a linear combination operator containing SDO and the Ruscheweyh derivative. We illustrate some inclusion properties and other inequalities involving SDO and its integral. [ABSTRACT FROM AUTHOR]

Published

2019