Root sets of polynomials and power series with finite choices of coefficients

Abstract

Given H⊂eq C two natural objects to study are the set of zeros of polynomials with coefficients in H, \z∈ C: ∃ k>0,\, ∃ (an)∈ Hk+1, Σn=0kanzn=0\, and the set of zeros of power series with coefficients in H, \z∈C: ∃ (an)∈ HN, Σn=0∞ anzn=0\. In this paper we consider the case where each element of H has modulus 1. The main result of this paper states that for any r∈(1/2,1), if H is 2-1(5-4|r|24)-dense in S1, then the set of zeros of polynomials with coefficients in H is dense in \z∈ C: |z|∈ [r,r-1]\, and the set of zeros of power series with coefficients in H contains the annulus \z∈ C: |z|∈[r,1)\. These two statements demonstrate quantitatively how the set of polynomial zeros/power series zeros fill out the natural annulus containing them as H becomes progessively more dense.