Your search keyword '"Masih, Vali Soltani"' showing total 3 results

1. Coefficients problems for families of holomorphic functions related to hyperbola.

Author

Kanas, Stanisława, Masih, Vali Soltani, and Ebadian, Ali

Subjects

*HOLOMORPHIC functions, *ANALYTIC functions, *CONIC sections, *UNIVALENT functions, *HYPERBOLA

Abstract

We consider a family of analytic and normalized functions that are related to the domains ℍ(s), with a right branch of a hyperbolas H(s) as a boundary. The hyperbola H(s) is given by the relation 1 ρ = 2 cos ⁡ φ s s (0 < s ≤ 1 , | φ | < (π s) / 2). $\begin{array}{} \frac{1}{\rho}=\left(2\cos\frac{\varphi}{s}\right)^s\quad (0 \lt s\le 1,\, |\varphi| \lt (\pi s)/2). \end{array}$ We mainly study a coefficient problem of the families of functions for which zf′/f or 1 + zf″/f′ map the unit disk onto a subset of ℍ(s). We find coefficients bounds, solve Fekete-Szegö problem and estimate the Hankel determinant. [ABSTRACT FROM AUTHOR]

Published

2020

2. Some properties associated to a certain class of starlike functions.

Author

Masih, Vali Soltani, Ebadian, Ali, and Yalçin, Sibel

Subjects

*STAR-like functions, *GEOMETRIC function theory, *ANALYTIC functions, *GEOMETRIC approach, *UNIVALENT functions, *CHARACTERISTIC functions

Abstract

Let 𝓐 denote the family of analytic functions f with f(0) = f′(0) – 1 = 0, in the open unit disk Δ. We consider a class S c s ∗ (α) := f ∈ A : z f ′ (z) f (z) − 1 ≺ z 1 + α − 1 z − α z 2 , z ∈ Δ , $$\begin{array}{} \displaystyle \mathcal{S}^{\ast}_{cs}(\alpha):=\left\{f\in\mathcal{A} : \left(\frac{zf'(z)}{f(z)}-1\right)\prec \frac{z}{1+\left(\alpha-1\right) z-\alpha z^2}, \,\, z\in \Delta\right\}, \end{array}$$ where 0 ≤ α ≤ 1/2, and ≺ is the subordination relation. The methods and techniques of geometric function theory are used to get characteristics of the functions in this class. Further, the sharp inequality for the logarithmic coefficients γn of f ∈ S c s ∗ $\begin{array}{} \mathcal{S}^{\ast}_{cs} \end{array}$ (α): ∑ n = 1 ∞ γ n 2 ≤ 1 4 1 + α 2 π 2 6 − 2 L i 2 − α + L i 2 α 2 , $$\begin{array}{} \displaystyle \sum_{n=1}^{\infty}\left|\gamma_n\right|^2 \leq \frac{1}{4\left(1+\alpha\right)^2}\left(\frac{\pi^2}{6}-2 \mathrm{Li}_2\left(-\alpha\right)+ \mathrm{Li}_2\left(\alpha^2\right)\right), \end{array}$$ where Li2 denotes the dilogarithm function are investigated. [ABSTRACT FROM AUTHOR]

Published

2019

3. Subclasses of Starlike and Convex Functions Associated with the Limaçon Domain.

Author

Masih, Vali Soltani and Kanas, Stanisława

Subjects

*STAR-like functions, *CONVEX functions, *ANALYTIC functions, *UNIVALENT functions, *MATHEMATICS, *STATISTICS

Abstract

Let ST L (s) and CV L (s) denote the family of analytic and normalized functions f in the unit disk D : = z : | z | < 1 , such that the quantity z f ′ (z) / f (z) or 1 + z f ″ (z) / f ′ (z) respectively are lying in the region bounded by the limaçon (u − 1) 2 + v 2 − s 4 2 = 4 s 2 u − 1 + s 2 2 + v 2 , where 0 < s ≤ 1 / 2 . The limaçon of Pascal is a curve that possesses properties which qualify it for the several applications in mathematics, statistics (hypothesis testing problem) but also in mechanics (fluid processing applications, known limaçon technology is employed to extract electrical power from low-grade heat, etc.). In this paper we present some results concerning the behavior of f on the classes ST L (s) or CV L (s) . Some appropriate examples are given. [ABSTRACT FROM AUTHOR]

Published

2020