Lower bound for a special form of rational approximations of entire functions on a semi-axis (Q1589115)

Let \(f\) be an entire function with the nonnegative Maclaurin coefficients and \(P_m/Q_n\) a rational function with \(m<n\). The author obtains a new lower bound for \(||\frac{1}{f}-\frac{P_m}{Q_n}||_{L_{\infty} [0,\infty)}\) depending on the caracteristics of growth of \(f\). In a particular case of \(m=0\) this leads to a refinement by order as \(n \rightarrow \infty\) of Reddy's estimate.