Meromorphic functions representable by series of rational fractions (Q1804161)

The paper is concerned with a function of form \(f(z) = \sum^ \infty_{k=1} {A_ k \over (z_ k - z)^ n}\), \(z_ k \to \infty\), \(n \geq 1\). The Nevanlinna logarithmic mean value of \(f\) on the circle of radius \(r\) denoted \(m(r,f)\) is estimated more precisely than in two papers: by Keldysh and by Goldberg and Ostrowsky. The estimates are given for \(r \to \infty\).