Relation between Small Functions with Differential Polynomials Generated by Meromorphic Solutions of Higher Order Linear Differential Equations

Benharrat Belaïdi, Zinelâabidine Latreuch

This paper is devoted to studying the growth and oscillation of higher order differential polynomial with meromorphic coefficients generated by meromorphic solutions of the linear differential equation $f^{\left( k\right) }+A\left( z\right) f=0 \left( k\geq 2 \right)$, where $A$ is a meromorphic function in the complex plane.