On a generalization of some Shah equation (Q6589505)

In the present paper under review the author considers solutions to the differential equation \N\[\N\frac{d^nw}{ds^n}+\left(a_1e^{hs}+a_2\right)\frac{dw}{ds}+\left(b_1e^{hs}+b_2\right)w=c_1e^{hs}+c_2, \quad n\geq 2, \quad h> 0 \tag{1}\N\]\Nwhere \(a_1,a_2,b_1,b_2,c_1,c_2\) are paramters. Under certain conditions, the author shows that this equation has a Dirichlet series solution \N\[\Nw=F(s)=\sum_{k=0}^{\infty}f_ke^{s\lambda_k}, \quad s=\sigma+it,\tag{2}\N\]\Nwhere the coefficients \(f_k\) are determined by the parameters \(a_1,a_2,b_1,b_2,c_1,c_2\) explicitly. Then the author shows that this solution is entire and satisfies \N\[\N\ln M(\sigma,F)=(1+o(1))\frac{n\sqrt[n]{|b_1|}}{h}e^{h\sigma/n}, \quad \sigma\to\infty.\tag{3}\N\]\NThe author also shows that this solution is pseudostarlike or pseudoconvex of order \(\alpha\in[0, h)\) and type \(\beta\in(0, 1]\), or close-to-pseudoconvex in the region \(\Pi_0=\{s: \text{Re}(s)<0\}\).