All possible orders less than 1 of transcendental entire solutions of linear difference equations with polynomial coefficients

Abstract

In this paper, we study all possible orders which are less than 1 of transcendental entire solutions of linear difference equations equation Pm(z)mf(z)+·s+P1(z) f(z)+P0(z)f(z)=0,+ equation where Pj(z) are polynomials for j=0,…,m. Firstly, we give the condition on existence of transcendental entire solutions of order less than 1 of difference equations (+). Secondly, we give a list of all possible orders which are less than 1 of transcendental entire solutions of difference equations (+). Moreover, the maximum number of distinct orders which are less than 1 of transcendental entire solutions of difference equations (+) are shown. In addition, for any given rational number 0<<1, we can construct a linear difference equation with polynomial coefficients which has a transcendental entire solution of order . At least, some examples are illustrated for our main theorems.