Zeros of a growing number of derivatives of random polynomials with independent roots

Abstract

Let X1,X2,… be independent and identically distributed random variables in C chosen from a probability measure μ and define the random polynomial Pn(z)=(z-X1)…(z-Xn)\,. We show that for any sequence k = k(n) satisfying k ≤ n / (5 n), the zeros of the kth derivative of Pn are asymptotically distributed according to the same measure μ. This extends work of Kabluchko, which proved the k = 1 case, as well as Byun, Lee and Reddy who proved the fixed k case.

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