Anti-concentration applied to roots of randomized derivatives of polynomials

Abstract

Let (Z(n)k)1 ≤ k ≤ n be a random set of points and let μn be its empirical measure: μn = 1n Σk=1n δZ(n)k. Let Pn(z) := (z - Z(n)1)·s (z - Z(n)n) and Qn (z) := Σk=1n γ(n)k Π1 ≤ j ≤ n, j ≠ k (z- Z(n)j), where (γ(n)k)1 ≤ k ≤ n are independent, i.i.d. random variables with Gamma distribution of parameter β/2, for some fixed β > 0. We prove that in the case where μn almost surely tends to μ when n → ∞, the empirical measure of the complex zeros of the randomized derivative Qn also converges almost surely to μ when n tends to infinity. Furthermore, for k = o(n / n), we obtain that the zeros of the k-th randomized derivative of Pn converge to the limiting measure μ in the same sense. We also derive the same conclusion for a variant of the randomized derivative related to the unit circle.

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