The speed of summation of power series outside the convergence circle (Q1921487)

Let \(G\) be an alpha-star region with respect to \(0\in G\). Let \(\sum^\infty_{k=0} f_kz^k\) be an analytic element in \(G\) having a unique analytic continuation \(f\) to \(G\). The author gives estimations of the rate of approximation of \(f\) in \(G\) by the polynomials of the form \[ \sum^n_{k=0} h(t_nk)f_kz^k,\quad n\to\infty, \] where \(h\) is a function satisfying several conditions and analytic in an angular region, \({\displaystyle{\lim_{n\to\infty}}} t_n=0\).