Oscillation results of higher order linear differential equation

Abstract

We study higher order linear differential equation y(k)+A1(z)y=0 with k≥2, where A1=A+h, A is a transcendental entire function of finite order with 12≤ μ(A)<1 and h≠0 is an entire function with (h)<μ(A). Then it is shown that, if f(k)+A(z)f=0 has a solution f with λ(f)<μ(A) then exponent of convergence of zeros of any non trivial solutions of y(k)+A1(z)y=0 is infinite.