摘要:In this paper, we shall utilize Nevanlinna value distribution theory to study the solvability of the difference equations of the form: f ( z ) n + p ( z ) ( Δ c f ) m = r ( z ) e q ( z ) and f ( z ) n + p ( z ) e q ( z ) ( Δ c f ) m = r ( z ) , and we shall study the growth of their entire solutions. Moreover, we will give a number of examples to show that the results in this paper are the best possible in certain senses. This article extends earlier results by Liu et al.
关键词:meromorphic functions ; difference equation ; growth ; finite order
