Taylor Domination, Difference Equations, and Bautin Ideals

Abstract

We compare three approaches to studying the behavior of an analytic function f(z)=Σk=0∞ akzk from its Taylor coefficients. The first is "Taylor domination" property for f(z) in the complex disk DR, which is an inequality of the form \[ |ak|Rk≤ C\ i=0,…,N\ |ai|Ri, \ k ≥ N+1. \] The second approach is based on a possibility to generate ak via recurrence relations. Specifically, we consider linear non-stationary recurrences of the form \[ ak=Σj=1dcj(k)· ak-j,\ \ k=d,d+1,…, \] with uniformly bounded coefficients. In the third approach we assume that ak=ak(λ) are polynomials in a finite-dimensional parameter λ ∈ Cn. We study "Bautin ideals" Ik generated by a1(λ),…,ak(λ) in the ring C[λ] of polynomials in λ. These three approaches turn out to be closely related. We present some results and questions in this direction.