Entire solutions of a class of nonlinear algebraic differential equations (Q2094822)

In this paper, the authors studied the algebraic differential equations of the form \[ P(y, y^{(n)})+Q(z, y, y',\dots,y^{(n)}) = 0 \] where \(P\) and \(Q\) are polynomials with complex coefficients and the degree of \(Q\) is less than that of \(P\). In fact, the author proved the following result: Let \(n\) and \(d\) be positive integers, and let \(P =\sum^d_{l=0}P_l \in \mathbb{C}[z, \omega_0, \dots , \omega_n]\), where \(P_l , l = 0, \dots , d,\) is a homogeneous polynomial of degree \(l\) in the variables \((\omega_0, \dots, \omega_n).\) Further, assume that \(P_d =\prod^d_{j=1}(\omega_n - \alpha_j\omega_0),\) where \(\alpha_1, \dots , \alpha_d \) are distinct complex numbers. Let \(y = f(z)\) be an entire solution of the differential equation \(P(z, y, y', \dots , y^{(n)}) = 0.\) Then there exists a positive integer N, complex numbers \(\beta_1,\dots,\beta_N ,\) and polynomials \(q_1(z), \dots, q_N(z) \in \mathbb{C}[z]\) such that \[ f(z) =\sum^N_{j=1}q_j(z)e^{\beta_jz}. \]