Your search keyword '"Ágnes Orsolya Páll-Szabó"' showing total 9 results

1. Analysis of a Normalized Structure of a Complex Fractal–Fractional Integral Transform Using Special Functions

Author

Rabha W. Ibrahim, Soheil Salahshour, and Ágnes Orsolya Páll-Szabó

Subjects

fractional calculus, fractal calculus, fractional difference operator, fractal–fractional differential operator, fractal–fractional calculus, complex transform, Mathematics, QA1-939

Abstract

By using the most generalized gamma function (parametric gamma function, or p-gamma function), we present the most generalized Rabotnov function, called the p-Rabotnov function. Consequently, new fractal–fractional differential and integral operators of a complex variable in an open unit disk are defined and investigated analytically and geometrically. We address some inequalities involving the generalized fractal–fractional integral operator in some spaces of analytic functions. A novel complex fractal–fractional integral transform (CFFIT) is presented. A normalization of the proposed CFFIT is observed in the open unit disk. Examples are illustrated for power series of analytic functions.

Published

2024

2. Toeplitz Matrices for a Class of Bazilevič Functions and the λ-Pseudo-Starlike Functions

Author

Abbas Kareem Wanas, Salam Abdulhussein Sehen, and Ágnes Orsolya Páll-Szabó

Subjects

analytic functions, Bazilevič functions, λ-pseudo-starlike functions, coefficient estimates, univalent functions, Toeplitz matrices, Mathematics, QA1-939

Abstract

In the present paper, we define and study a new family of holomorphic functions which involve the Bazilevič functions and the λ-pseudo-starlike functions. We establish coefficient estimates for the first four determinants of the symmetric Toeplitz matrices T2(2), T2(3), T3(1) and T3(2) for the functions in this family. Further, we investigate several special cases and consequences of our results.

Published

2024

3. Coefficient Related Studies for New Classes of Bi-Univalent Functions

Author

Ágnes Orsolya Páll-Szabó and Georgia Irina Oros

Subjects

bi-univalent functions, Sălăgean integral and differential operator, coefficient bounds, Fekete–Szegő problem, Mathematics, QA1-939

Abstract

Using the recently introduced Sălăgean integro-differential operator, three new classes of bi-univalent functions are introduced in this paper. In the study of bi-univalent functions, estimates on the first two Taylor–Maclaurin coefficients are usually given. We go further in the present paper and bounds of the first three coefficients a 2 , a 3 and a 4 of the functions in the newly defined classes are given. Obtaining Fekete–Szegő inequalities for different classes of functions is a topic of interest at this time as it will be shown later by citing recent papers. So, continuing the study on the coefficients of those classes, the well-known Fekete–Szegő functional is obtained for each of the three classes.

Published

2020

4. Extensions of coefficient estimates for new classes of bi-univalent functions defined by Sǎlǎgean integro-differential operator

Author

Ágnes Orsolya Páll-Szabó

Subjects

010101 applied mathematics, Pure mathematics, Computational Theory and Mathematics, Applied Mathematics, 010102 general mathematics, 0101 mathematics, Statistics, Probability and Uncertainty, Differential operator, 01 natural sciences, Mathematical Physics, Mathematics

Abstract

In this paper, we introduce and investigate three new general classes of bi-starlike and bi-convex functions of Ma–Minda type defined by the Sǎlǎgean integro-differential operator. Bounds of the first three coefficients | a 2 | {\lvert a_{2}\rvert} , | a 3 | {\lvert a_{3}\rvert} and | a 4 | {\lvert a_{4}\rvert} are given.

Published

2020

5. Differential subordination results for holomorphic functions associated with Wanas Operator and Poisson Distribution series

Author

Ágnes Orsolya Páll-Szabó and Abbas Kareem Wanas

Subjects

Subordination (linguistics), symbols.namesake, Pure mathematics, Operator (computer programming), Series (mathematics), symbols, Holomorphic function, Probability and statistics, Poisson distribution, Differential (mathematics), Mathematics

Abstract

In the current paper, we introduce a new family for holomorphic functions defined by Wanas operator associated with Poisson distribution series. Also we derive some interesting geometric properties for functions belongs to this family.

Published

2020

6. Modified Hadamard product properties of certain class of analytic functions with varying arguments defined by the convolution of Sǎlǎgean and Ruscheweyh derivative

Author

Ágnes Orsolya Páll-Szabó

Subjects

Class (set theory), Pure mathematics, General Mathematics, hadamard product, 30c45, 010103 numerical & computational mathematics, Derivative, 01 natural sciences, Convolution, the convolution of sǎlǎgean and ruscheweyh derivative, 010101 applied mathematics, analytic functions, QA1-939, Hadamard product, 0101 mathematics, Mathematics, Analytic function

Abstract

In this paper we study the Hadamard product properties of certain class of analytic functions with varying arguments defined by the convolution of Sǎlǎgean and Ruscheweyh derivative. The obtained results are sharp and they improve known results.

Published

2019

7. Modified Hadamard product properties of certain class of analytic functions with varying arguments defined by Sălăgean and Ruscheweyh derivative

Author

Ágnes Orsolya Páll-Szabó

Subjects

Pure mathematics, Class (set theory), General Mathematics, Hadamard product, Derivative, Mathematics, Analytic function

Abstract

In this paper we study the modified Hadamard product properties of certain class of analytic functions with varying arguments defined by Salagean and Ruscheweyh derivative. The obtained results are sharp and they improve known results.

Published

2017

8. The radius of convexity of particular functions and applications to the study of a second order differential inequality

Author

Ágnes Orsolya Páll-Szabó and Olga Engel

Subjects

Subordination (linguistics), Lemma (mathematics), Control and Optimization, Mathematics::Complex Variables, Applied Mathematics, 010102 general mathematics, Mathematical analysis, Order (ring theory), Radius, 01 natural sciences, Convexity, Convolution, 010101 applied mathematics, 0101 mathematics, Analysis, Differential (mathematics), Differential inequalities, Mathematics

Abstract

In this paper we determine the radius of convexity of particular functions. The obtained results are used to deduce sharp estimates regarding functions which satisfy a second order differential subordination. A lemma regarding starlikeness that involves the notion of convolution is established, and is used in order to obtain a sharp starlikeness condition.

Published

2017

9. Properties of certain class of analytic functions with varying arguments defined by Ruscheweyh derivative

Author

Ágnes Orsolya Páll-Szabó and Olga Engel

Subjects

Class (set theory), Pure mathematics, integral operators, General Mathematics, hadamard product, ruscheweyh derivative, chemistry.chemical_compound, analytic functions, chemistry, QA1-939, Derivative (chemistry), Mathematics, Analytic function

Abstract

In the paper are studied the properties of the image of a class of analytic functions defined by the Ruscheweyh derivative trough the Bernardi operator.

Published

2015