Lower order and Baker wandering domains of solutions to differential equations with coefficients of exponential growth

Abstract: We investigate transcendental entire solutions of complex differential equations f + A(z)f = H(z), where the entire function A(z) has a growth property similar to the exponential functions, and H(z) is an entire function of order less than that of A. We first prove that the lower order of the entire solution to the equation is infinity. By using our result on the lower order, we prove the entire solution does not bear any Baker wandering domains.

On limiting directions of entire solutions of complex differential-difference equations

On limiting directions of entire solutions of complex differential-difference equations

On the Uniqueness of Random Entire Functions

Lower order and limiting directions of Julia sets of solutions to second order differential equations