Your search keyword '"Geometric function theory"' showing total 100 results

1. Coefficient Functionals of Sakaguchi-Type Starlike Functions Involving Caputo-Type Fractional Derivatives Subordinated to the Three-Leaf Function.

Author

Alsager, Kholood M., El-Deeb, Sheza M., Murugusundaramoorthy, Gangadharan, and Breaz, Daniel

Subjects

*GEOMETRIC function theory, *ANALYTIC functions, *SYMMETRIC functions, *UNIVALENT functions, *FUNCTIONALS

Abstract

A challenging part of studying geometric function theory is figuring out the sharp boundaries for coefficient-related problems that crop up in the Taylor–Maclaurin series of univalent functions. Using Caputo-type fractional derivatives to define the families of Sakaguchi-type starlike functions with respect to symmetric points, this article aims to investigate the first three initial coefficient estimates, the bounds for various problems such as Fekete–Szegő inequality, and the Zalcman inequalities, by subordinating to the function of the three leaves domain. Fekete–Szegő-type inequalities and initial coefficients for functions of the form H − 1 and ζ H (ζ) and 1 2 log H ζ ζ connected to the three leaves functions are also discussed. [ABSTRACT FROM AUTHOR]

Published

2024

2. Geometric Features of the Hurwitz–Lerch Zeta Type Function Based on Differential Subordination Method.

Author

Abdulnabi, Faten F., F. Al-Janaby, Hiba, Ghanim, Firas, and Lupaș, Alina Alb

Subjects

*GEOMETRIC function theory, *UNIVALENT functions, *GEOMETRIC series, *SPECIAL functions, *HOLOMORPHIC functions

Abstract

The interest in special complex functions and their wide-ranging implementations in geometric function theory (GFT) has developed tremendously. Recently, subordination theory has been instrumentally employed for special functions to explore their geometric properties. In this effort, by using a convolutional structure, we combine the geometric series, logarithm, and Hurwitz–Lerch zeta functions to formulate a new special function, namely, the logarithm-Hurwitz–Lerch zeta function (LHL-Z function). This investigation then contributes to the study of the LHL-Z function in terms of the geometric theory of holomorphic functions, based on the differential subordination methodology, to discuss and determine the univalence and convexity conditions of the LHL-Z function. Moreover, there are other subordination and superordination connections that may be visually represented using geometric methods. Functions often exhibit symmetry when subjected to conformal mappings. The investigation of the symmetries of these mappings may provide a clearer understanding of how subordination and superordination with the Hurwitz–Lerch zeta function behave under different transformations. [ABSTRACT FROM AUTHOR]

Published

2024

3. Asymptotic Conformality and Polygonal Approximation.

Author

Krushkal, Samuel L.

Subjects

*GEOMETRIC function theory, *TEICHMULLER spaces, *UNIVALENT functions, *QUADRATIC differentials, *GAUSSIAN curvature, *QUASICONFORMAL mappings, *CONFORMAL mapping

Abstract

Univalent functions with asymptotically conformal extension to the boundary form a subclass of functions with quasiconformal extension with rather special features. Such functions arise in various questions of geometric function theory and Teichmüller space theory and have important applications involving conformal and quasiconformal maps. The paper provides an approximative characterization of local conformality and its connection with univalent polynomials. Also, some other quantitative applications of this connection are given. [ABSTRACT FROM AUTHOR]

Published

2024

4. On Quasi-Subordination for Bi-Univalency Involving Generalized Distribution Series.

Author

Olatunji, Sunday Olufemi, Oluwayemi, Matthew Olanrewaju, Porwal, Saurabh, and Alb Lupas, Alina

Subjects

*GEOMETRIC function theory, *ANALYTIC functions, *RESEARCH personnel, *UNIVALENT functions, *COEFFICIENTS (Statistics)

Abstract

Various researchers have considered different forms of bi-univalent functions in recent times, and this has continued to gain more attention in Geometric Function Theory (GFT), but not much study has been conducted in the area of application of the certain probability concept in geometric functions. In this manuscript, our motivation is the application of analytic and bi-univalent functions. In particular, the researchers examine bi-univalency of a generalized distribution series related to Bell numbers as a family of Caratheodory functions. Some coefficients of the class of the function are obtained. The results are new as far work on bi-univalency is concerned. [ABSTRACT FROM AUTHOR]

Published

2024

5. New Trends in Complex Analysis Research.

Author

Oros, Georgia Irina

Subjects

*ANALYTIC functions, *UNIVALENT functions, *TREND analysis, *GEOMETRIC function theory, *FUNCTIONS of several complex variables, *MEROMORPHIC functions, *SYMMETRIC functions

Abstract

This document is a summary of a special issue of the journal "Mathematics" that focuses on new trends in complex analysis research. The issue includes 14 papers that cover various aspects of complex-valued functions of one or several complex variables. The papers explore topics such as coefficient estimates, starlikeness and convexity of analytic functions, holomorphic and bi-univalent functions, and integral operators. The research presented in the papers aims to contribute to the development of complex analysis and inspire further studies in the field. The document also acknowledges the authors and reviewers who contributed to the special issue's success. [Extracted from the article]

Published

2024

6. New Developments in Geometric Function Theory II.

Author

Oros, Georgia Irina

Subjects

*GEOMETRIC function theory, *UNIVALENT functions, *ANALYTIC functions, *MEROMORPHIC functions, *SYMMETRIC functions, *HYPERGEOMETRIC functions, *INVERSE functions

Abstract

This document is a summary of a special issue of the journal Axioms titled "New Developments in Geometric Function Theory II." The special issue contains 14 research papers that explore various topics related to complex-valued functions in the field of Geometric Function Theory. The papers cover subjects such as coefficient estimates, subordination theories, hypergeometric functions, and differential operators. Each paper presents new findings and results that contribute to the development of Geometric Function Theory. The special issue is recommended for researchers and scholars interested in this field of study. The document also acknowledges the authors, reviewers, and editors involved in the creation of the special issue. [Extracted from the article]

Published

2024

7. First-order differential subordinations associated with Carathéodory functions.

Author

Kim, Inhwa, Sim, Young Jae, and Cho, Nak Eun

Subjects

GEOMETRIC function theory, UNIVALENT functions, ANALYTIC functions, STAR-like functions

Abstract

In the present paper, we investigated some conditions to be in the class of Carathéodory functions by using the concept of the first-order differential subordinations. Moreover, various interesting special cases were considered in the geometric function theory as applications of main results presented here. [ABSTRACT FROM AUTHOR]

Published

2024

8. Certain geometric properties of the fractional integral of the Bessel function of the first kind.

Author

Oros, Georgia Irina, Oros, Gheorghe, and Bardac-Vlada, Daniela Andrada

Subjects

FRACTIONAL integrals, INTEGRAL functions, INTEGRAL calculus, GEOMETRIC function theory, FRACTIONAL calculus, BESSEL functions, STAR-like functions, INTEGRAL inequalities, UNIVALENT functions

Abstract

This paper revealed new fractional calculus applications of special functions in the geometric function theory. The aim of the study presented here was to introduce and begin the investigations on a new fractional calculus integral operator defined as the fractional integral of order λ for the Bessel function of the first kind. The focus of this research was on obtaining certain geometric properties that give necessary and sufficient univalence conditions for the new fractional calculus operator using the methods associated to differential subordination theory, also referred to as admissible functions theory, developed by Sanford S. Miller and Petru T. Mocanu. The paper discussed, in the proved theorems and corollaries, conditions that the fractional integral of the Bessel function of the first kind must comply in order to be a part of the sets of starlike functions, positive and negative order starlike functions, convex functions, positive and negative order convex functions, and close-to-convex functions, respectively. The geometric properties proved for the fractional integral of the Bessel function of the first kind recommend this function as a useful tool for future developments, both in geometric function theory in general, as well as in differential subordination and superordination theories in particular. [ABSTRACT FROM AUTHOR]

Published

2024

9. On Third Hankel Determinant for Certain Subclass of Bi-Univalent Functions.

Author

Shakir, Qasim Ali and Atshan, Waggas Galib

Subjects

*UNIVALENT functions, *GEOMETRIC function theory, *HANKEL functions, *GEOMETRIC analysis, *ANALYTIC functions, *MATHEMATICS

Abstract

This study presents a subclass S (β) of bi-univalent functions within the open unit disk region D . The objective of this class is to determine the bounds of the Hankel determinant of order 3, ( Ⱨ 3 (1) ). In this study, new constraints for the estimates of the third Hankel determinant for the class S (β) are presented, which are of considerable interest in various fields of mathematics, including complex analysis and geometric function theory. Here, we define these bi-univalent functions as S (β) and impose constraints on the coefficients │ a n │ . Our investigation provides the upper bounds for the bi-univalent functions in this newly developed subclass, specifically for n = 2, 3, 4, and 5. We then derive the third Hankel determinant for this particular class, which reveals several intriguing scenarios. These findings contribute to the broader understanding of bi-univalent functions and their potential applications in diverse mathematical contexts. Notably, the results obtained may serve as a foundation for future investigations into the properties and applications of bi-univalent functions and their subclasses. [ABSTRACT FROM AUTHOR]

Published

2024

10. Geometric Properties of Normalized Galué Type Struve Function.

Author

Sarkar, Samanway, Das, Sourav, and Mondal, Saiful R.

Subjects

*GEOMETRIC function theory, *HARDY spaces, *SYMMETRIC functions, *STAR-like functions, *CONVEX functions, *UNIVALENT functions

Abstract

The field of geometric function theory has thoroughly investigated starlike functions concerning symmetric points. The main objective of this work is to derive certain geometric properties, such as the starlikeness of order δ , convexity of order δ , k-starlikeness, k-uniform convexity, lemniscate starlikeness and convexity, exponential starlikeness and convexity, and pre-starlikeness for the Galué type Struve function (GTSF). Furthermore, the conditions for GTSF belonging to the Hardy space are also derived. The results obtained in this work generalize several results available in the literature. [ABSTRACT FROM AUTHOR]

Published

2024

11. Applications of Fuzzy Differential Subordination to the Subclass of Analytic Functions Involving Riemann–Liouville Fractional Integral Operator.

Author

Breaz, Daniel, Khan, Shahid, Tawfiq, Ferdous M. O., and Tchier, Fairouz

Subjects

*FRACTIONAL integrals, *GEOMETRIC function theory, *INTEGRAL operators, *DIFFERENTIAL operators, *ANALYTIC functions, *UNIVALENT functions, *MERGERS & acquisitions, *FUZZY sets

Abstract

In this research, we combine ideas from geometric function theory and fuzzy set theory. We define a new operator D τ − λ L α , ζ m : A → A of analytic functions in the open unit disc Δ with the help of the Riemann–Liouville fractional integral operator, the linear combination of the Noor integral operator, and the generalized Sălăgean differential operator. Further, we use this newly defined operator D τ − λ L α , ζ m together with a fuzzy set, and we next define a new class of analytic functions denoted by R ϝ ζ (m , α , δ). Several innovative results are found using the concept of fuzzy differential subordination for the functions belonging to this newly defined class, R ϝ ζ (m , α , δ). The study includes examples that demonstrate the application of the fundamental theorems and corollaries. [ABSTRACT FROM AUTHOR]

Published

2023

12. Coefficient Bounds for Some Families of Bi-Univalent Functions with Missing Coefficients †.

Author

Analouei Adegani, Ebrahim, Jafari, Mostafa, Bulboacă, Teodor, and Zaprawa, Paweł

Subjects

*GEOMETRIC function theory, *UNIVALENT functions, *COEFFICIENTS (Statistics), *ANALYTIC functions, *TWENTIETH century

Abstract

A branch of complex analysis with a rich history is geometric function theory, which first appeared in the early 20th century. The function theory deals with a variety of analytical tools to study the geometric features of complex-valued functions. The main purpose of this paper is to estimate more accurate bounds for the coefficient | a n | of the functions that belong to a class of bi-univalent functions with missing coefficients that are defined by using the subordination. The significance of our present results consists of improvements to some previous results concerning different recent subclasses of bi-univalent functions, and the aim of this paper is to improve the results of previous outcomes. In addition, important examples of some classes of such functions are provided, which can help to understand the issues related to these functions. [ABSTRACT FROM AUTHOR]

Published

2023

13. Analytic Functions Related to a Balloon-Shaped Domain.

Author

Ahmad, Adeel, Gong, Jianhua, Al-Shbeil, Isra, Rasheed, Akhter, Ali, Asad, and Hussain, Saqib

Subjects

*UNIVALENT functions, *GEOMETRIC function theory, *HANKEL functions, *ANALYTIC functions

Abstract

One of the fundamental parts of Geometric Function Theory is the study of analytic functions in different domains with critical geometrical interpretations. This article defines a new generalized domain obtained based on the quotient of two analytic functions. We derive various properties of the new class of normalized analytic functions X defined in the new domain, including the sharp estimates for the coefficients a 2 , a 3 , and a 4 , and for three second-order and third-order Hankel determinants, H 2 , 1 X , H 2 , 2 X , and H 3 , 1 X . The optimality of each obtained estimate is given as well. [ABSTRACT FROM AUTHOR]

Published

2023

14. On the Study of Starlike Functions Associated with the Generalized Sine Hyperbolic Function.

Author

Gul, Baseer, Arif, Muhammad, Alhefthi, Reem K., Breaz, Daniel, Cotîrlă, Luminiţa-Ioana, and Rapeanu, Eleonora

Subjects

*HYPERBOLIC functions, *STAR-like functions, *GEOMETRIC function theory, *SINE function, *ANALYTIC functions, *UNIVALENT functions, *CONVEX functions

Abstract

Geometric function theory, a subfield of complex analysis that examines the geometrical characteristics of analytic functions, has seen a sharp increase in research in recent years. In particular, by employing subordination notions, the contributions of different subclasses of analytic functions associated with innovative image domains are of significant interest and are extensively investigated. Since ℜ (1 + sinh (z)) ≯ 0 , it implies that the class S sinh * introduced in reference third by Kumar et al. is not a subclass of starlike functions. Now, we have introduced a parameter λ with the restriction 0 ≤ λ ≤ ln (1 + 2) , and by doing that, ℜ (1 + sinh (λ z)) > 0. The present research intends to provide a novel subclass of starlike functions in the open unit disk U , denoted as S sinh λ * , and investigate its geometric nature. For this newly defined subclass, we obtain sharp upper bounds of the coefficients a n for n = 2 , 3 , 4 , 5. Then, we prove a lemma, in which the largest disk contained in the image domain of q 0 (z) = 1 + sinh (λ z) and the smallest disk containing q 0 (U) are investigated. This lemma has a central role in proving our radius problems. We discuss radius problems of various known classes, including S * (β) and K (β) of starlike functions of order β and convex functions of order β. Investigating S sinh λ * radii for several geometrically known classes and some classes of functions defined as ratios of functions are also part of the present research. The methodology used for finding S sinh λ * radii of different subclasses is the calculation of that value of the radius r < 1 for which the image domain of any function belonging to a specified class is contained in the largest disk of this lemma. A new representation of functions in this class, but for a more restricted range of λ , is also obtained. [ABSTRACT FROM AUTHOR]

Published

2023

15. Fuzzy differential subordination related to strongly Janowski functions.

Author

Kanwal, Bushra, Hussain, Saqib, and Saliu, Afis

Subjects

*ANALYTIC functions, *LINEAR operators, *INTEGRAL operators, *DIFFERENTIAL operators, *UNIVALENT functions, *GEOMETRIC function theory

Abstract

The research presented in this paper concerns the notion of geometric function theory called fuzzy differential subordination. Using the technique associated with fuzzy differential subordination, a new subclass of analytic functions related with the strongly Janowski-type functions is defined. The class is introduced by using a new operator defined by the convolution of the generalized Sălăgean differential operator and Choi integral linear operator. Certain inclusion relations are proved for this class by using the notion of fuzzy differential subordination. In addition, new fuzzy differential subordinations are obtained that characterize this class. [ABSTRACT FROM AUTHOR]

Published

2023

16. Study on the Criteria for Starlikeness in Integral Operators Involving Bessel Functions.

Author

Oros, Georgia Irina, Oros, Gheorghe, and Bardac-Vlada, Daniela Andrada

Subjects

*INTEGRAL operators, *STAR-like functions, *GEOMETRIC function theory, *BESSEL functions, *UNIVALENT functions, *HOLOMORPHIC functions, *FUNCTION spaces

Abstract

The study presented in this paper follows a line of research familiar for Geometric Function Theory, which consists in defining new integral operators and conducting studies for revealing certain geometric properties of those integral operators such as univalence, starlikness, or convexity. The present research focuses on the Bessel function of the first kind and order ν unveiling the conditions for this function to be univalent and further using its univalent form in order to define a new integral operator on the space of holomorphic functions. For particular values of the parameters implicated in the definition of the new integral operator involving the Bessel function of the first kind, the well-known Alexander, Libera, and Bernardi integral operators can be obtained. In the first part of the study, necessary and sufficient conditions are obtained for the Bessel function of the first kind and order ν to be a starlike function or starlike of order α ∈ [ 0 , 1) . The renowned prolific method of differential subordination due to Sanford S. Miller and Petru T. Mocanu is employed in the reasoning. In the second part of the study, the outcome of the first part is applied in order to introduce the new integral operator involving the form of the Bessel function of the first kind, which is starlike. Further investigations disclose the necessary and sufficient conditions for this new integral operator to be starlike or starlike of order 1 2 . [ABSTRACT FROM AUTHOR]

Published

2023

17. Certain Properties of Harmonic Functions Defined by a Second-Order Differential Inequality.

Author

Breaz, Daniel, Durmuş, Abdullah, Yalçın, Sibel, Cotirla, Luminita-Ioana, and Bayram, Hasan

Subjects

*HARMONIC functions, *UNIVALENT functions, *DIFFERENTIAL inequalities, *GEOMETRIC function theory, *COMPUTER software development

Abstract

The Theory of Complex Functions has been studied by many scientists and its application area has become a very wide subject. Harmonic functions play a crucial role in various fields of mathematics, physics, engineering, and other scientific disciplines. Of course, the main reason for maintaining this popularity is that it has an interdisciplinary field of application. This makes this subject important not only for those who work in pure mathematics, but also in fields with a deep-rooted history, such as engineering, physics, and software development. In this study, we will examine a subclass of Harmonic functions in the Theory of Geometric Functions. We will give some definitions necessary for this. Then, we will define a new subclass of complex-valued harmonic functions, and their coefficient relations, growth estimates, radius of univalency, radius of starlikeness and radius of convexity of this class are investigated. In addition, it is shown that this class is closed under convolution of its members. [ABSTRACT FROM AUTHOR]

Published

2023

18. Higher-Order Derivatives of Differential Subordination of Multivalent Functions.

Author

Hameed, Mustafa I., Al-Dulaimi, Shaheed Jameel, and Joshua, Hussaini

Subjects

GEOMETRIC function theory, UNIVALENT functions, STAR-like functions, RESEARCH personnel, OPERATOR functions

Abstract

The research into theory for analytic univalent as well as multivalent functions is an ancient subject for mathematics, especially in complex analysis, which has attracted a great number for scholars due to utter elegance of the its geometrical characteristics as well as numerous research opportunities. The study of univalent functions is one of most important areas of complex analysis for only one and many variables. Researchers have been interested in the traditional study of this subject since at least 1907. During this time until now many researchers in the field of complex analysis, including as Euler, Gauss, Riemann, Cauchy, and many others, have developed. Geometric function theory is a combination or interplay of geometry and analysis. The main goal of this article is to investigate the principle for dependence as well as add an additional subset for polyvalent functions with a different operator that is related to derivatives of higher order. As a result, the findings were important in terms of various geometric properties, including coefficient estimation, distortion as well as growth borders, radii for starlikeness, convexity, as well as close-to-convexity. [ABSTRACT FROM AUTHOR]

Published

2023

19. New Criteria for Starlikness and Convexity of a Certain Family of Integral Operators.

Author

Srivastava, Hari M., Alavi, Rogayeh, Shams, Saeid, Aghalary, Rasoul, and Joshi, Santosh B.

Subjects

*INTEGRAL operators, *GEOMETRIC function theory, *ANALYTIC functions, *UNIVALENT functions, *STAR-like functions

Abstract

In this paper, we first modify one of the most famous theorems on the principle of differential subordination to hold true for normalized analytic functions with a fixed initial Taylor-Maclaurin coefficient. By using this modified form, we generalize and improve several results, which appeared recently in the literature on the geometric function theory of complex analysis. We also prove some simple conditions for starlikeness, convexity, and the strong starlikeness of several one-parameter families of integral operators, including (for example) a certain μ -convex integral operator and the familiar Bernardi integral operator. [ABSTRACT FROM AUTHOR]

Published

2023

20. SANDWICH RESULTS FOR MULTIVALENT FUNCTIONS DEFINED BY GENERALIZED SRIVASTAVA-ATTIYA OPERATOR.

Author

MOSTAFA, ADELA O., BULBOACĂ, TEODOR, and AOUF, MOHAMED K.

Subjects

UNIVALENT functions, GEOMETRIC function theory, ZETA functions, ANALYTIC functions

Abstract

The paper contains new results in the field of Geometric Function Theory of one variable functions, specially connected with the concepts of differential subordinations and superordinations, and that could be used for further investigation in this area. We defined a new subclasses of analytic multivalent functions in the open unit disk D with the aid of the generalized well-known Srivastava-Attiya operator obtained by a convolution product with the general Hurwitz-Lerch Zeta function. For the functions belonging to these subclasses we obtain sharp subordination and superordination results, that generalizes some previous well-known subordination properties obtained by different authors. The main results are followed by some particular cases obtained for special choices of the parameters, some of them being connected with the Janowski type functions. The technique used in the proofs is based on the general theory of differential subordinations and superordination initiated and developed by S.S. Miller and P. T. Mocanu. We emphasize that these results are sharp in the sense that there are the best possible under the given assumptions of our theorems and corollaries, that is the dominants cannot be improved. These new results generalizes some previous well-known subordination properties obtained by different authors. [ABSTRACT FROM AUTHOR]

Published

2023

21. Certain differential subordination results for univalent functions associated with $ q $-Salagean operators.

Author

Amini, Ebrahim, Fardi, Mojtaba, Al-Omari, Shrideh, and Saadeh, Rania

Subjects

UNIVALENT functions, ANALYTIC functions, STAR-like functions, GEOMETRIC function theory, DIFFERENTIAL operators, INTEGRAL operators, SET functions

Abstract

In this paper, we employ the concept of the q -derivative to derive certain differential and integral operators, D q , λ n and I q , λ n , resp., to generalize the class of Salagean operators over the set of univalent functions. By means of the new operators, we establish the subclasses M q , λ n and D q , λ n of analytic functions on an open unit disc. Further, we study coefficient inequalities for each function in the given classes. Over and above, we derive some properties and characteristics of the set of differential subordinations by following specific techniques. In addition, we study the general properties of D q , λ n and I q , λ n and obtain some interesting differential subordination results. Several results are also derived in some details. [ABSTRACT FROM AUTHOR]

Published

2023

22. ANALYTIC UNIVALENT FUCNTIONS DEFINED BY GEGENBAUER POLYNOMIALS.

Author

OLATUNJI, S. O.

Subjects

UNIVALENT functions, GEGENBAUER polynomials, GEOMETRIC function theory, ANALYTIC functions, CONVEX functions

Abstract

The numerical tools that have outshinning many others in the history of Geometric Function Theory (GFT) are the Chebyshev and Gegenbauer polynomials in the present time. Recently, Gegenbauer polynomials have been used to define several subclasses of an analytic functions and their yielded results are in the public domain. In this work, analytic univalent functions defined by Gegenbauer polynomials is considered using close-to-convex approach of starlike function. Some early few coefficient bounds obtained are used to establish the famous Fekete-Szego inequalities. [ABSTRACT FROM AUTHOR]

Published

2023

23. Inequalities of bi-starlike functions involving Sigmoid function and Bernoulli Lemniscate by subordination.

Author

Sakar, F. Müge and Aydoğan, S. Melike

Subjects

GEOMETRIC function theory, STAR-like functions, UNIVALENT functions

Abstract

The sigmoid function increases the size of the hypothesis space that the network can represent. Neural networks can be used for complex learning tasks. It is therefore necessary to investigate the role of sigmoid function in geometric function theory. In this study, a new subclass of bi-starlike functions involving Sigmoid function and Bernol li Lemniscate was defined. Some coefficient bounds belonging to this newly defined subclass were also obtained by using subordination principle. The key tools in the proof of our main results are the coefficient Fekete-Szegö inequalities for this subclass. The results obtained agree and extend some earlier results. [ABSTRACT FROM AUTHOR]

Published

2023

24. On the Third Hankel Determinant of Certain Subclass of Bi-Univalent Functions.

Author

Darweesh, Amal M., Atshan, Waggas G., Battor, Ali H., and Mahdi, Mohammed S.

Subjects

HANKEL functions, GEOMETRIC function theory, UNIVALENT functions, GEOMETRIC analysis, CHEBYSHEV polynomials, MATHEMATICS

Abstract

In this study, we introduce a novel subclass of bi-univalent functions, which are of considerable interest in various fields of mathematics, including complex analysis and geometric function theory. By employing the property of subordination, we define these bi-univalent functions as R(t, γ, λ) and impose constraints on the coefficients | an |. Our investigation provides the upper bounds for the bi-univalent functions in this newly developed subclass, specifically for n=2, 3, 4, and 5. We then derive the third Hankel determinant for this particular class, which reveals several intriguing scenarios. These findings contribute to the broader understanding of bi-univalent functions and their potential applications in diverse mathematical contexts. Notably, the results obtained may serve as a foundation for future investigations into the properties and applications of bi-univalent functions and their subclasses. [ABSTRACT FROM AUTHOR]

Published

2023

25. New Applications of Fuzzy Set Concept in the Geometric Theory of Analytic Functions.

Author

Alb Lupaş, Alina

Subjects

*GEOMETRIC function theory, *FUZZY sets, *UNIVALENT functions, *SET theory, *CONVEX functions, *ANALYTIC functions

Abstract

Zadeh's fuzzy set theory offers a logical, adaptable solution to the challenge of defining, assessing and contrasting various sustainability scenarios. The results presented in this paper use the fuzzy set concept embedded into the theories of differential subordination and superordination established and developed in geometric function theory. As an extension of the classical concept of differential subordination, fuzzy differential subordination was first introduced in geometric function theory in 2011. In order to generalize the idea of fuzzy differential superordination, the dual notion of fuzzy differential superordination was developed later, in 2017. The two dual concepts are applied in this article making use of the previously introduced operator defined as the convolution product of the generalized Sălgean operator and the Ruscheweyh derivative. Using this operator, a new subclass of functions, normalized analytic in U, is defined and investigated. It is proved that this class is convex, and new fuzzy differential subordinations are established by applying known lemmas and using the functions from the new class and the aforementioned operator. When possible, the fuzzy best dominants are also indicated for the fuzzy differential subordinations. Furthermore, dual results involving the theory of fuzzy differential superordinations and the convolution operator are established for which the best subordinants are also given. Certain corollaries obtained by using particular convex functions as fuzzy best dominants or fuzzy best subordinants in the proved theorems and the numerous examples constructed both for the fuzzy differential subordinations and for the fuzzy differential superordinations prove the applicability of the new theoretical results presented in this study. [ABSTRACT FROM AUTHOR]

Published

2023

26. Initial Coefficients Upper Bounds for Certain Subclasses of Bi-Prestarlike Functions.

Author

Hamadneh, Tareq, Abu Falahah, Ibraheem, AL-Khassawneh, Yazan Alaya, Al-Husban, Abdallah, Wanas, Abbas Kareem, and Bulboacă, Teodor

Subjects

*UNIVALENT functions, *STAR-like functions, *GEOMETRIC function theory, *HOLOMORPHIC functions

Abstract

In this article, we introduce and study the behavior of the modules of the first two coefficients for the classes N Σ (γ , λ , δ , μ ; α) and N Σ * (γ , λ , δ , μ ; β) of normalized holomorphic and bi-univalent functions that are connected with the prestarlike functions. We determine the upper bounds for the initial Taylor–Maclaurin coefficients | a 2 | and | a 3 | for the functions of each of these families, and we also point out some special cases and consequences of our main results. The study of these classes is closely connected with those of Ruscheweyh who in 1977 introduced the classes of prestarlike functions of order μ using a convolution operator and the proofs of our results are based on the well-known Carathédory's inequality for the functions with real positive part in the open unit disk. Our results generalize a few of the earlier ones obtained by Li and Wang, Murugusundaramoorthy et al., Brannan and Taha, and could be useful for those that work with the geometric function theory of one-variable functions. [ABSTRACT FROM AUTHOR]

Published

2023

27. Jackson Differential Operator Associated with Generalized Mittag–Leffler Function.

Author

Attiya, Adel A., Yassen, Mansour F., and Albaid, Abdelhamid

Subjects

*DIFFERENTIAL operators, *UNIVALENT functions, *ANALYTIC functions, *GEOMETRIC function theory, *HYPERGEOMETRIC series, *CALCULUS

Abstract

Quantum calculus plays a significant role in many different branches such as quantum physics, hypergeometric series theory, and other physical phenomena. In our paper and using quantitative calculus, we introduce a new family of normalized analytic functions in the open unit disk, which relates to both the generalized Mittag–Leffler function and the Jackson differential operator. By using a differential subordination virtue, we obtain some important properties such as coefficient bounds and the Fekete–Szegő problem. Some results that represent special cases of this family that have been studied before are also highlighted. [ABSTRACT FROM AUTHOR]

Published

2023

28. Investigation of the Second-Order Hankel Determinant for Sakaguchi-Type Functions Involving the Symmetric Cardioid-Shaped Domain.

Author

Ullah, Khalil, Arif, Muhammad, Aldawish, Ibtisam Mohammed, and El-Deeb, Sheza M.

Subjects

*SYMMETRIC domains, *SYMMETRIC functions, *UNIVALENT functions, *HANKEL functions, *STAR-like functions, *CONVEX functions, *GEOMETRIC function theory

Abstract

Determining the sharp bounds for coefficient-related problems that appear in the Taylor–Maclaurin series of univalent functions is one of the most difficult aspects of studying geometric function theory. The purpose of this article is to establish the sharp bounds for a variety of problems, such as the first three initial coefficient problems, the Zalcman inequalities, the Fekete–Szegö type results, and the second-order Hankel determinant for families of Sakaguchi-type functions related to the cardioid-shaped domain. Further, we study the logarithmic coefficients for both of these classes. [ABSTRACT FROM AUTHOR]

Published

2023

29. Application of subordination and superordination for multivalent analytic functions associated with differintegral operator.

Author

Ali, Ekram E., El-Ashwah, Rabha M., and Sidaoui, R.

Subjects

ANALYTIC functions, GEOMETRIC function theory, STAR-like functions, UNIVALENT functions

Abstract

The results from this paper are related to the geometric function theory. In order to obtain them, we use the technique based on the properties of the differential subordination and superordination one of the newest techniques used in this field, we obtain some differential subordination and superordination results for multivalent functions defined by differintegral operator with j-derivatives =p(v, p;l) f (z) for l > 0; v; p 2 R; such that (p - j) ≥ 0; v > lp; (p 2 N) in the open unit disk U. Differential sandwich result is also obtained. Also, the results are followed by some special cases and counter examples. [ABSTRACT FROM AUTHOR]

Published

2023

30. Coefficient Results concerning a New Class of Functions Associated with Gegenbauer Polynomials and Convolution in Terms of Subordination.

Author

Olatunji, Sunday Olufemi, Oluwayemi, Matthew Olanrewaju, and Oros, Georgia Irina

Subjects

*GEGENBAUER polynomials, *GEOMETRIC function theory, *ANALYTIC functions, *UNIVALENT functions, *ERROR functions, *STAR-like functions

Abstract

Gegenbauer polynomials constitute a numerical tool that has attracted the interest of many function theorists in recent times mainly due to their real-life applications in many areas of the sciences and engineering. Their applications in geometric function theory (GFT) have also been considered by many researchers. In this paper, this powerful tool is associated with the prolific concepts of convolution and subordination. The main purpose of the research contained in this paper is to introduce and study a new subclass of analytic functions. This subclass is presented using an operator defined as the convolution of the generalized distribution and the error function and applying the principle of subordination. Investigations into this subclass are considered in connection to Carathéodory functions, the modified sigmoid function and Bell numbers to obtain coefficient estimates for the contained functions. [ABSTRACT FROM AUTHOR]

Published

2023

31. Results on Second-Order Hankel Determinants for Convex Functions with Symmetric Points.

Author

Ullah, Khalil, Al-Shbeil, Isra, Faisal, Muhammad Imran, Arif, Muhammad, and Alsaud, Huda

Subjects

*SYMMETRIC functions, *CONVEX functions, *HYPERBOLIC functions, *UNIVALENT functions, *LOGARITHMIC functions, *GEOMETRIC function theory

Abstract

One of the most important problems in the study of geometric function theory is knowing how to obtain the sharp bounds of the coefficients that appear in the Taylor–Maclaurin series of univalent functions. In the present investigation, our aim is to calculate some sharp estimates of problems involving coefficients for the family of convex functions with respect to symmetric points and associated with a hyperbolic tangent function. These problems include the first four initial coefficients, the Fekete–Szegö and Zalcman inequalities, and the second-order Hankel determinant. Additionally, the inverse and logarithmic coefficients of the functions belonging to the defined class are also studied in relation to the current problems. [ABSTRACT FROM AUTHOR]

Published

2023

32. Inequalities of bi-starlike functions involving Sigmoid function and Bernoulli Lemniscate by subordination.

Author

Müge Sakar, F. and Aydoğan, S. Melike

Subjects

GEOMETRIC function theory, STAR-like functions, UNIVALENT functions

Abstract

The sigmoid function increases the size of the hypothesis space that the network can represent. Neural networks can be used for complex learning tasks. It is therefore necessary to investigate the role of sigmoid function in geometric function theory. In this study, a new subclass of bi-starlike functions involving Sigmoid function and Bernolli Lemniscate was defined. Some coefficient bounds belonging to this newly defined subclass were also obtained by using subordination principle. The key tools in the proof of our main results are the coefficient Fekete-Szegö inequalities for this subclass. The results obtained agree and extend some earlier results. [ABSTRACT FROM AUTHOR]

Published

2023

33. On a New Subclass of q -Starlike Functions Defined in q -Symmetric Calculus.

Author

Razzaque, Asima, Noor, Saima, and Hussain, Saqib

Subjects

*STAR-like functions, *CALCULUS, *ANALYTIC functions, *UNIVALENT functions, *GEOMETRIC function theory, *SYMMETRIC functions, *IMAGE processing, *CONVEX functions

Abstract

Geometric function theory combines geometric tools and their applications for information and communication analysis. It is also successfully used in the field of advanced signals, image processing, machine learning, speech and sound recognition. Various new subclasses of analytic functions have been defined using quantum calculus to investigate many interesting properties of these subclasses. This article defines a new class of q-starlike functions in the open symmetric unit disc ∇ using symmetric quantum calculus. Extreme points for this class as well as coefficient estimates and closure theorems have been investigated. By fixing several coefficients finitely, all results were generalized into families of analytic functions. [ABSTRACT FROM AUTHOR]

Published

2023

34. New Developments in Geometric Function Theory.

Author

Oros, Georgia Irina

Subjects

*GEOMETRIC function theory, *UNIVALENT functions, *ANALYTIC functions, *MEROMORPHIC functions, *CONVEX functions, *FRACTIONAL calculus

Abstract

A previously introduced operator defined by applying the Riemann-Liouville fractional integral to the convex combination of well-known Ruscheweyh and Salagean differential operators is used for defining a new fuzzy subclass. The authors suggest that the operator introduced here can be utilized to define other classes of analytic functions or to generalize other types of differential operators. The new operator defined in this paper can be used to introduce other specific subclasses of analytic functions, and quantum calculus can be also investigated in future studies. The fractional differential operator and the Mittag-Leffler functions are combined to formulate and arrange a new operator of fractional calculus. [Extracted from the article]

Published

2023

35. CERTAIN RESULTS OF STARLIKE AND CONVEX FUNCTIONS IN SOME CONDITIONS.

Author

YILDIZ, Ismet and SAHIN, Hasan

Subjects

*STAR-like functions, *CONVEX functions, *UNIVALENT functions, *GEOMETRIC function theory, *ANALYTIC functions, *COMPLEX numbers

Abstract

The theory of geometric functions was first introduced by Bernard Riemann in 1851. In 1916, with the concept of normalized function revealed by Bieberbach, univalent function concept has found application area. Assume f(z)=z+Σn>2(anzn converges for all complex numbers z with 1,|z|, and f(z)is one-to-one on the set of such z. Convex and starlike functions f(z) and g(z) are discussed with the help of subordination. The f(z) and g(z) are analytic in unit disc and f(0)0,f'(0)=1, and g(0)=0,g'(0)-1=0. A single valued function f(z) is said to be univalent (or schlict or one-to-one) in domain DCC never gets the same value twice; that is, if f(x1)-fz2 for all z1 and z2 with z1= z2. Let A be the class of analytic functions in the unit disk U={z:|z|1} that are normalized with f(0)=0,f'(0)=1. In this paper we give the some necessary conditions for f(z)E S*[a,a²] and 0< a²

Published

2022

36. Admissible Classes of Multivalent Meromorphic Functions Defined by a Linear Operator.

Author

Ali, Ekram E., El-Ashwah, Rabha M., Albalahi, Abeer M., and Breaz, Nicoleta

Subjects

*MEROMORPHIC functions, *GEOMETRIC function theory, *ANALYTIC functions, *LINEAR operators, *UNIVALENT functions

Abstract

The results from this paper are related to the geometric function theory. In order to obtain them, we use the technique based on differential subordination, one of the newest techniques used in the field, also known as the technique of admissible functions. For that, the appropriate classes of admissible functions are first defined. Based on these classes, we obtain some differential subordination and superordination results for multivalent meromorphic functions, analytic in the punctured unit disc, related to a linear operator ℑ ρ , τ p (ν) , for τ > 0 , ν , ρ ∈ C , such that R e (ρ − ν) ≧ 0 , R e (ν) > τ p , (p ∈ N) . Moreover, taking into account both subordination and superordination results, we derive a sandwich-type theorem. The connection with some other known results and an example are also provided. [ABSTRACT FROM AUTHOR]

Published

2022

37. Applications of Symmetric Quantum Calculus to the Class of Harmonic Functions.

Author

Khan, Mohammad Faisal, Al-Shbeil, Isra, Aloraini, Najla, Khan, Nazar, and Khan, Shahid

Subjects

*HARMONIC functions, *STAR-like functions, *GEOMETRIC function theory, *UNIVALENT functions, *CALCULUS, *ANALYTIC functions, *DIFFERENTIAL operators

Abstract

In the past few years, many scholars gave much attention to the use of q-calculus in geometric functions theory, and they defined new subclasses of analytic and harmonic functions. While using the symmetric q-calculus in geometric function theory, very little work has been published so far. In this research, with the help of fundamental concepts of symmetric q-calculus and the symmetric q-Salagean differential operator for harmonic functions, we define a new class of harmonic functions connected with Janowski functions S H 0 ˜ m , q , A , B . First, we illustrate the necessary and sufficient convolution condition for S H 0 ˜ m , q , A , B and then prove that this sufficient condition is a sense preserving and univalent, and it is necessary for its subclass TS H 0 ˜ m , q , A , B . Furthermore, by using this necessary and sufficient coefficient condition, we establish some novel results, particularly convexity, compactness, radii of q-starlike and q-convex functions of order α , and extreme points for this newly defined class of harmonic functions. Our results are the generalizations of some previous known results. [ABSTRACT FROM AUTHOR]

Published

2022

38. Properties of q -Symmetric Starlike Functions of Janowski Type.

Author

Saliu, Afis, Al-Shbeil, Isra, Gong, Jianhua, Malik, Sarfraz Nawaz, and Aloraini, Najla

Subjects

*STAR-like functions, *GEOMETRIC function theory, *UNIVALENT functions

Abstract

The word "symmetry" is a Greek word that originated from "symmetria". It means an agreement in dimensions, due proportion, and arrangement; however, in complex analysis, it means objects remaining invariant under some transformation. This idea has now been recently used in geometric function theory to modify the earlier classical q-derivative introduced by Ismail et al. due to its better convergence properties. Consequently, we introduce a new class of analytic functions by using the notion of q-symmetric derivative. The investigation in this paper obtains a number of the latest important results in q-theory, including coefficient inequalities and convolution characterization of q-symmetric starlike functions related to Janowski mappings. [ABSTRACT FROM AUTHOR]

Published

2022

39. Univalence criteria for analytic functions obtained using fuzzy differential subordinations.

Author

OROS, Georgia Irina

Subjects

*GEOMETRIC function theory, *ANALYTIC functions, *FUZZY sets, *SET theory, *MATHEMATICIANS, *STAR-like functions, *UNIVALENT functions

Abstract

Ever since Lotfi A. Zadeh published the paper "Fuzzy Sets" in 1965 setting the basis of a new theory named fuzzy sets theory, many scientists have developed this theory and its applications. Mathematicians were especially interested in extending classical mathematical results in the fuzzy context. Such an extension was also done relating fuzzy sets theory and geometric theory of analytic functions. The study begun in 2011 has many interesting published outcomes and the present paper follows the line of the previous research in the field. The aim of the paper is to give some references related to the connections already made between fuzzy sets theory and geometric theory of analytic functions and to present some new results that might prove interesting for mathematicians willing to enlarge their views on certain aspects of the merge between the two theories. Using the notions of fuzzy differential subordination and the classical notion of differential subordination for analytic functions, two criteria for the univalence of the analytic functions are stated in this work. [ABSTRACT FROM AUTHOR]

Published

2022

40. Properties of a Subclass of Analytic Functions Defined by Using an Atangana–Baleanu Fractional Integral Operator.

Author

Alb Lupaş, Alina and Cătaş, Adriana

Subjects

*GEOMETRIC function theory, *INTEGRAL operators, *ANALYTIC functions, *FRACTIONAL integrals

Abstract

The Atangana–Baleanu fractional integral and multiplier transformations are two functions successfully used separately in many recently published studies. They were previously combined and the resulting function was applied for obtaining interesting new results concerning the theories of differential subordination and fuzzy differential subordination. In the present investigation, a new approach is taken by using the operator previously introduced by applying the Atangana–Baleanu fractional integral to a multiplier transformation for introducing a new subclass of analytic functions. Using the methods familiar to geometric function theory, certain geometrical properties of the newly introduced class are obtained such as coefficient estimates, distortion theorems, closure theorems, neighborhoods and the radii of starlikeness, convexity, and close-to-convexity of functions belonging to the class. This class may have symmetric or assymetric properties. The results could prove interesting for future studies due to the new applications of the operator and because the univalence properties of the new subclass of functions could inspire further investigations having it as the main focus. [ABSTRACT FROM AUTHOR]

Published

2022

41. Applications of the Atangana–Baleanu Fractional Integral Operator.

Author

Alb Lupaş, Alina and Cătaş, Adriana

Subjects

*FRACTIONAL integrals, *GEOMETRIC function theory, *INTEGRAL operators, *ANALYTIC functions

Abstract

Applications of the Atangana–Baleanu fractional integral were considered in recent studies related to geometric function theory to obtain interesting differential subordinations. Additionally, the multiplier transformation was used in many studies, providing elegant results. In this paper, a new operator is defined by combining those two prolific functions. The newly defined operator is applied for introducing a new subclass of analytic functions, which is investigated concerning certain properties, such as coefficient estimates, distortion theorems, closure theorems, neighborhoods and radii of starlikeness, convexity and close-to-convexity. This class may have symmetric or asymmetric properties. The results could prove interesting due to the new applications of the Atangana–Baleanu fractional integral and of the multiplier transformation. Additionally, the univalence properties of the new subclass of functions could inspire researchers to conduct further investigations related to this newly defined class. [ABSTRACT FROM AUTHOR]

Published

2022

42. Based on a family of bi-univalent functions introduced through the q-analogue of Noor integral operator.

Author

Akgül, A. and Alçın, B.

Subjects

INTEGRAL operators, GEOMETRIC function theory, UNIVALENT functions, ANALYTIC functions

Abstract

Recently, q-analogue of Noor integral operator and other special operators became importance in the field of Geometric Function Theory. In this study, by connecting this operators we introduced an interesting class of bi-univalent functions and obtained coefficient estimates for this new class. Also we present some relevant corollaries. [ABSTRACT FROM AUTHOR]

Published

2022

43. On a geometric study of a class of normalized functions defined by Bernoulli's formula.

Author

Ibrahim, Rabha W., Aldawish, Ibtisam, and Baleanu, Dumitru

Subjects

*UNIVALENT functions, *HYPERGEOMETRIC functions, *STAR-like functions, *SPECIAL functions, *ANALYTIC functions, *GEOMETRIC function theory

Abstract

The central purpose of this effort is to investigate analytic and geometric properties of a class of normalized analytic functions in the open unit disk involving Bernoulli's formula. As a consequence, some solutions are indicated by the well-known hypergeometric function. The class of starlike functions is investigated containing the suggested class. [ABSTRACT FROM AUTHOR]

Published

2021

44. On a new linear operator formulated by Airy functions in the open unit disk.

Author

Ibrahim, Rabha W. and Baleanu, Dumitru

Subjects

*AIRY functions, *GEOMETRIC function theory, *UNIVALENT functions, *ANALYTIC functions, *LINEAR operators

Abstract

In this note, we formulate a new linear operator given by Airy functions of the first type in a complex domain. We aim to study the operator in view of geometric function theory based on the subordination and superordination concepts. The new operator is suggested to define a class of normalized functions (the class of univalent functions) calling the Airy difference formula. As a result, the suggested difference formula joining the linear operator is modified to different classes of analytic functions in the open unit disk. [ABSTRACT FROM AUTHOR]

Published

2021

45. CONVEXITY OF CERTAIN INTEGRAL OPERATOR DEFINED BY MITTAG-LEFFLER FUNCTIONS.

Author

ÇAĞLAR, MURAT and YILMAZ, SAIP EMRE

Subjects

INTEGRAL operators, GEOMETRIC function theory, UNIVALENT functions, MATHEMATICIANS, ANALYTIC functions, SPECIAL functions, STAR-like functions

Abstract

Recently, there has been a vivid interest on special functions from the point of view of geometric function theory. Geometric properties of special functions like univalency, starlikeness and convexity appear in works of many mathematicians. In this paper, firstly, we obtain a new family of integral operators involving normalized Mittag-Leffler functions. Then, we give various sufficient conditions for convexity of this integral operator in the open unit disk. Several consequences of the main results are also shown. [ABSTRACT FROM AUTHOR]

Published

2021

46. On the Fekete--Szegö type functionals for functions which are convex in the direction of the imaginary axis.

Author

Zaprawa, Paweł

Subjects

*HOLOMORPHIC functions, *GEOMETRIC function theory, *UNIVALENT functions, *STAR-like functions, *HANKEL functions, *ANALYTIC functions, *FUNCTIONALS

Published

2020

47. Generalized Briot-Bouquet differential equation based on new differential operator with complex connections.

Author

Ibrahim, Rabha W.

Subjects

*UNIVALENT functions, *DIFFERENTIAL operators, *MATHEMATICS education, *GEOMETRIC function theory, *DIFFERENTIAL-difference equations

Abstract

Inequality study is a magnificent field for investigating the geometric behaviors of analytic functions in the open unit disk calling the subordination and superordination. In this work, we aim to formulate a generalized differential-difference operator. We introduce a new class of analytic functions having the generalized operator. Some subordination results are included in the sequel. [ABSTRACT FROM AUTHOR]

Published

2020

48. APPLICATIONS OF HORADAM POLYNOMIALS TO GENERAL CLASSES OF BI-UNIVALENT FUNCTIONS INVOLVING THE q-DERIVATIVE OPERATOR.

Author

ALTINKAYA, ŞAHSENE and YALÇIN, SIBEL

Subjects

POLYNOMIALS, DERIVATIVES (Mathematics), GEOMETRIC function theory, VARIATIONAL inequalities (Mathematics), UNIVALENT functions

Abstract

In this present investigation, by using the Horadam polynomials, we aim to build a bridge between the theory of geometric functions and that of special functions, which are usually considered very different fields. Thus, we introduce some new classes of bi-univalent functions defined by combining the q-derivative operator and the Horadam polynomials. Afterwards, we derive coefficient inequalities and consider the classical Fekete-Szegö problem. [ABSTRACT FROM AUTHOR]

Published

2020

49. (p, q)-Lucas polynomials and their applications to bi-univalent functions.

Author

Altinkaya, Şahsene and Yalçin, Sibel

Subjects

*GEOMETRIC function theory, *UNIVALENT functions, *POLYNOMIALS, *SPECIAL functions

Abstract

In the present paper, by using the Lp,q,n(x) functions, our methodology intertwine to yield the Theory of Geometric Functions and that of Special Functions, which are usually considered as very different fields. Thus, we aim at introducing a new class of biunivalent functions defined through the (p, qJ-Lucas polynomials. Furthermore, we derive coefficient inequalities and obtain Fekete-Szego problem for this new function class. [ABSTRACT FROM AUTHOR]

Published

2019

50. A certain subclass of bi-univalent analytic functions introduced by means of the q-analogue of Noor integral operator and Horadam polynomials.

Author

AKGÜL, Arzu and SAKAR, F. Müge

Subjects

*UNIVALENT functions, *ANALYTIC functions, *POLYNOMIAL operators, *INTEGRAL operators, *GEOMETRIC function theory, *SPECIAL functions

Abstract

In the present study, by using the Horadam Polnomials and q-analogue of Noor integral oprerator, we target to construct an interesting connection between the geometric function theory and that of special functions. Also, by defining a new class of bi-univalent analytic functions, we investigate coefficient estimates and famous Fekete-Szegö inequality for functions belonging to this interesting class. [ABSTRACT FROM AUTHOR]

Published

2019