On meromorphic solutions of algebraic differential equations in angular domains

Abstract

We obtain asymptotic estimates of meromorphic solutions to the differential equationP _n (z, ω, ω′)=P _n−1 (z, ω, ω′,...,ω ^(m)) in the angular domain P={z:α ≤ arg z · ≤ β}. Here P_n(z, w, w′) is a polynomial in all variables, and of degree n with respect to w and w′; P_n−1(z, w, w′, ..., w^(m)) is a polynomial in all variables, and of degree ≤n −1 with respect to w, w′, ..., w^(m) In the particular case, when the solutions are entire functions, these estimates are more precise than the known estimates that are obtained by using the method of Wiman-Valiron, which cannot be applied to meromorphic solutions in the domain P.