Bounds for the Faber coefficients of certain classes of functions analytic in an ellipse (Q2566484)

Let \(\Omega\) be a bounded, simply connected domain in the plane \({\mathbf C}\), \(0\in\Omega\), \(\partial\Omega\)-analytic. Let \(S(\Omega)\) denote the class of functions \(F\) which are analytic and univalent in \(\Omega\), \(F(0)=F'(0)-1=0\). Let \(\{\Phi_n(z)\}^\infty_{n=0}\) be the Faber polynomials associated with \(\Omega\). If \(F\in S(\Omega)\), then \(F\) can be expanded in a sereis of the form \(F(z)=\sum^\infty_{n=0} A_n\Phi_n(z)\), \(z\in\Omega\). Let \(E_r=\{(x,y)\in{\mathbf R}^2:x^2(1+ \frac{1}{r^2})^{-2}+y^2(1-\frac{1}{r^2})^{-2}<1\}\), where \(r>1\). In this paper the authors obtained formulas for Faber coefficients of functions \(F\) belonging to \(S(E_r)\) and to subclasses of \(S(E_r):C(E_r)= \{F\subset S(E_r):F (E_r)\) is convex\}, \(S^{(2)}(E_r)=\{F\subset S(E_r):F\) is odd\} and to the class \(P(E_r)=\{F:\) analytic in \(E_r\) and \(\text{Re}\,F(z)>0\), \(z\in E_r\}\). There are also theorems about sharp bounds for the Faber coefficients \(A_0,A_1,A_2\), of functions \(F\) of the class \(S(E_r)\) and of the above-mentioned classes. Similar results were obtained by \textit{W. C. Royster} [Duke Math. J. 26, 361--371 (1959; Zbl 0115.29104)] and by \textit{E. Haliloğlu} [Proc. Japan Acad., Ser. A 73, No. 6, 116--121 (1997; Zbl 0898.30011)].