Faber polynomial coefficient inequalities for bi-Bazilevič functions associated with the Fibonacci-number series and the square-root functions

H. M. Srivastava; Shahid Khan; Sarfraz Nawaz Malik; Fairouz Tchier; Afis Saliu; Qin Xin

doi:10.1186/s13660-024-03090-9

Faber polynomial coefficient inequalities for bi-Bazilevič functions associated with the Fibonacci-number series and the square-root functions

H. M. Srivastava, Shahid Khan, Sarfraz Nawaz Malik, Fairouz Tchier, Afis Saliu, Qin Xin

Research output: Contribution to journal › Article › peer-review

5 Citations (Scopus)

Abstract

Two new subclasses of the class of bi-Bazilevič functions, which are related to the Fibonacci-number series and the square-root functions, are introduced and studied in this article. Under a special choice of the parameter involved, these two classes of Bazilevič functions reduce to two new subclasses of star-like biunivalent functions related with the Fibonacci-number series and the square-root functions. Using the Faber polynomial expansion (FPE) technique, we find the general coefficient bounds for the functions belonging to each of these classes. We also find bounds for the initial coefficients for bi-Bazilevič functions and demonstrate how unexpectedly these initial coefficients behave in relation to the square-root functions and the Fibonacci-number series.

Original language	English
Journal	Journal of Inequalities and Applications
Volume	2024
Issue number	16
DOIs	https://doi.org/10.1186/s13660-024-03090-9
Publication status	Published - 2024

Keywords

Analytic functions
Univalent functions
Biunivalent functions
Bazilevic functions
Fibonacci numbers
Faber polynomials expansions
Fekete
Szegö problem

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Cite this

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title = "Faber polynomial coefficient inequalities for bi-Bazilevi{\v c} functions associated with the Fibonacci-number series and the square-root functions",

abstract = "Two new subclasses of the class of bi-Bazilevi{\v c} functions, which are related to the Fibonacci-number series and the square-root functions, are introduced and studied in this article. Under a special choice of the parameter involved, these two classes of Bazilevi{\v c} functions reduce to two new subclasses of star-like biunivalent functions related with the Fibonacci-number series and the square-root functions. Using the Faber polynomial expansion (FPE) technique, we find the general coefficient bounds for the functions belonging to each of these classes. We also find bounds for the initial coefficients for bi-Bazilevi{\v c} functions and demonstrate how unexpectedly these initial coefficients behave in relation to the square-root functions and the Fibonacci-number series.",

keywords = "Analytic functions, Univalent functions, Biunivalent functions, Bazilevic functions, Fibonacci numbers, Faber polynomials expansions, Fekete, Szeg{\"o} problem",

author = "Srivastava, {H. M.} and Shahid Khan and Malik, {Sarfraz Nawaz} and Fairouz Tchier and Afis Saliu and Qin Xin",

year = "2024",

doi = "10.1186/s13660-024-03090-9",

language = "English",

volume = "2024",

journal = "Journal of Inequalities and Applications",

issn = "1029-242X",

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T1 - Faber polynomial coefficient inequalities for bi-Bazilevič functions associated with the Fibonacci-number series and the square-root functions

AU - Srivastava, H. M.

AU - Khan, Shahid

AU - Malik, Sarfraz Nawaz

AU - Tchier, Fairouz

AU - Saliu, Afis

AU - Xin, Qin

PY - 2024

Y1 - 2024

N2 - Two new subclasses of the class of bi-Bazilevič functions, which are related to the Fibonacci-number series and the square-root functions, are introduced and studied in this article. Under a special choice of the parameter involved, these two classes of Bazilevič functions reduce to two new subclasses of star-like biunivalent functions related with the Fibonacci-number series and the square-root functions. Using the Faber polynomial expansion (FPE) technique, we find the general coefficient bounds for the functions belonging to each of these classes. We also find bounds for the initial coefficients for bi-Bazilevič functions and demonstrate how unexpectedly these initial coefficients behave in relation to the square-root functions and the Fibonacci-number series.

AB - Two new subclasses of the class of bi-Bazilevič functions, which are related to the Fibonacci-number series and the square-root functions, are introduced and studied in this article. Under a special choice of the parameter involved, these two classes of Bazilevič functions reduce to two new subclasses of star-like biunivalent functions related with the Fibonacci-number series and the square-root functions. Using the Faber polynomial expansion (FPE) technique, we find the general coefficient bounds for the functions belonging to each of these classes. We also find bounds for the initial coefficients for bi-Bazilevič functions and demonstrate how unexpectedly these initial coefficients behave in relation to the square-root functions and the Fibonacci-number series.

KW - Analytic functions

KW - Univalent functions

KW - Biunivalent functions

KW - Bazilevic functions

KW - Fibonacci numbers

KW - Faber polynomials expansions

KW - Fekete

KW - Szegö problem

U2 - 10.1186/s13660-024-03090-9

DO - 10.1186/s13660-024-03090-9

M3 - Article

SN - 1029-242X

VL - 2024

JO - Journal of Inequalities and Applications

JF - Journal of Inequalities and Applications

IS - 16

ER -

Faber polynomial coefficient inequalities for bi-Bazilevič functions associated with the Fibonacci-number series and the square-root functions

Abstract

Keywords

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