Almost sure behavior of the critical points of random polynomials

Abstract

Let (Zk)k≥ 1 be a sequence of independent and identically distributed complex random variables with common distribution μ and let Pn(X):=Πk=1n (X-Zk) the associated random polynomial in C[X]. In [Kab15], the author established the conjecture stated by Pemantle and Rivin in [PR13] that the empirical measure n associated with the critical points of Pn converges weakly in probability to the base measure μ. In this note, we establish that the convergence in fact holds in the almost sure sense. Our result positively answers a question raised by Z. Kabluchko and formalized as a conjecture in the recent paper [MV22].