Coeffcient bounds and Fekete-Szego problem for a class of analytic functions defined by using a new differential operator

Bucur, Roberta; Andrei, Loriana; Breaz, Daniel

doi:10.12988/ams.2015.511

Cited by 12 publications

(10 citation statements)

References 9 publications

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“…Several interesting properties and characteristics of the Hurwitz-Lerch Zeta function Φ(z, s, a) can be found in [9], and the references stated there in (see also [20], [21,30]). Srivastava and Attiya [30] (also see [2,8,19]) introduced and investigated the linear operator:…”

Section: Introductionmentioning

confidence: 99%

Some applications of generalized Srivastava-Attiya operator to the bi-concave functions

Altınkaya¹,

Yalçın²

2020

MMN

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Section: Introductionmentioning

confidence: 99%

Some applications of generalized Srivastava-Attiya operator to the bi-concave functions

Altınkaya¹,

Yalçın²

2020

MMN

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“…The study of operators plays an important role in the Geometric Function Theory and its related fields. It is observed that this formalism brings an ease in further mathematical exploration and also helps to understand the geometric properties of such operators better (see, for example [2], [3], [7], [12] and [15]). Recently, Darus andİbrahim [8] introduced a differential operator…”

Section: Introductionmentioning

confidence: 99%

Application of quasi-subordination for certain subclasses of bi-univalent functions of complex order

Altınkaya¹

2019

Malaya J. Mat.

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“…Its source was in the disproof by Fekete and Szegö of the 1933 guess of Littlewood and Paley that the coefficients of odd univalent functions are limited by unity (see [9], has since received great attention, especially in many subclasses of the family of univalent functions). For that reason Fekete-Szegö functional was studied by many authors and a some assessments were found in a many subclasses of normalized univalent functions (see [3], [8], [12], [13] and [16]).…”

Section: Introduction and Definitionsmentioning

confidence: 99%

Application of Chebyshev polynomials to certain subclass of Non-Bazilevic functions

Juma¹,

Abdulhussain²,

Al-Khafaji³

2018

Filomat

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In this paper, we introduce a new certain subclass N(α, λ, t) of Non-Bazilević analytic functions of type (1 − α) by using the Chebyshev polynomials expansions. We investigated some basic useful characteristics for this class, also we obtain coefficient bounds and Fekete-Szegö inequalities for functions belong to this class. This class is considered a general case for some of the previously studied classes. Further we discuss its consequences. which are analytic and univalent in the open unit disk U = {z : z ∈ C : |z| < 1}. Let S be the class of analytic functions f (z) ∈ A and normalized with the following conditions f (0) = 0 and f (0) = 1. Let f (z) and (z) are analytic functions in U, we say that the function f (z) is a subordinate to (z) in U, written as f (z) ≺ (z), if there exists a Schwarz function w(z), which is analytic in U with w(0) = 0 and |w(z)| < 1, (z ∈ U) such that f (z) = (w(z)). Furthermore, if (z) is univalent in U, then we have the following equivalent f (z) ≺ (z), (z ∈ U) ⇐⇒ f (0) = (0) and f (U) ⊂ (U). (see[7]) The Fekete-Szegö functional |a 3 − µa 2 2 | for normalized Taylor-Mclaurin series f (z) = z + a 2 z 2 + a 3 z 3 + ...

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Coeffcient bounds and Fekete-Szego problem for a class of analytic functions defined by using a new differential operator

Abstract: In this paper we obtain coefficient bounds and Fekete-Szegö inequalities for a new subclass B n,b α,µ,λ,ω (ϕ) of analytic functions defined by a new differential operator. Some of our results generalize the related work of some authors.

Cited by 12 publications

References 9 publications

Some applications of generalized Srivastava-Attiya operator to the bi-concave functions

Some applications of generalized Srivastava-Attiya operator to the bi-concave functions

Application of quasi-subordination for certain subclasses of bi-univalent functions of complex order

Application of Chebyshev polynomials to certain subclass of Non-Bazilevic functions

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