The Faber polynomial expansion method and its application to the general coefficient problem for some subclasses of bi-univalent functions associated with a certain $q$-integral operator
Abstract
In our present investigation, we first introduce several new subclasses of
analytic and bi-univalent functions by using a certain $q$-integral
operator in the open unit disk
$$\mathbb{U}=\{z: z\in \mathbb{C} \quad \text{and} \quad \left
\vert z\right \vert <1\}.$$
By applying the Faber polynomial expansion
method as well as the $q$-analysis, we then
determine bounds for the $n$th coefficient in the
Taylor-Maclaurin series expansion for functions
in each of these newly-defined analytic and
bi-univalent function classes subject to a gap series condition.
We also highlight some known consequences of our main results.
Keywords
Analytic functions; Univalent functions; Taylor-Maclaurin series representation; Faber polynomials; Bi-Univalent functions; $q$-Derivative operator; $q$-hypergeometric functions; $q$-Integral operators.
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PDFDOI: http://dx.doi.org/10.24193/subbmath.2018.4.01
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