On Meromorphic Solutions to a Difference Equation of Tumura-Clunie Type

Abstract

The meromorphic solutions f with 2(f)<1 of the non-linear difference equation align* fn(z)+Pd(z,f)=p1eλ1z+p2eλ2z+p3eλ3z, align* are characterized in terms of exponential functions using Nevanlinna theory, under certain conditions on λj for j=1,2,3. Here, n>2, Pd(z,f) is a difference polynomial in f of degree n-1, and λj,~pj=0 for ~j=1,2,3. These results improve upon those previously obtained by Chen et al.[Bull. Korean Math. Soc. 61, 745-762 (2024)]. Some examples are provided to illustrate these results. Additionally, if Pd(z,f) is a differential-difference polynomial, then under the supplementary condition N(r,f)=S(r,f), by applying the same proof method, these conclusions still hold.