Roots of polynomial sequences in root-sparse regions

Abstract

Given a family (qk)k of polynomials, we call an open set U root-sparse if the number of zeros of qk is locally uniformly bounded on U. We study the interplay between the individual zeros of the polynomials qk and those of the mth derivatives qk(m), in a root-sparse open set U, as k∞. More precisely, if the root distributions μk of qk converge weak* to some compactly supported measure μ, whose potential is nowhere locally constant on a root-sparse open set U, then we link the roots of the mth derivative qkm, for an arbitrary m>0, to the roots of qk and the critical points of the potential pμ on compact subsets of U. We apply this result in a polynomial dynamics setting to obtain convergence results for the roots of the mth derivative of iterates of a polynomial outside the filled-in Julia set. We also apply our result in the setting of extremal polynomials.