Weighted equilibrium and the flow of derivatives of polynomials

Abstract

Given a sequence of polynomials Qn of degree n with zeros on [-1,1], we consider the triangular table of derivatives Qn, k(x)=dk Qn(x) /d xk. Under the assumption that the sequence \Qn\ has a weak* limiting zero distribution (an empirical distribution of zeros) given by the arcsine law, we show that as n, k → ∞ such that k / n → t ∈[0,1), the zero-counting measure of the polynomials Qn, k converges to an explicitly given measure μt. This measure is the equilibrium measure of [-1,1] of size 1-t in an external field given by two mass points of size t/2 fixed at 1. The main goal of this paper is to provide a direct potential theory proof of this fact.