On random polynomials with an intermediate number of real roots

Abstract

For each α ∈ (0, 1), we construct a bounded monotone deterministic sequence (ck)k ≥ 0 of real numbers so that the number of real roots of the random polynomial fn(z) = Σk=0n ck k zk is nα + o(1) with probability tending to one as the degree n tends to infinity, where (k) is a sequence of i.i.d. (real) random variables of finite mean satisfying a mild anti-concentration assumption. In particular, this includes the case when (k) is a sequence of i.i.d. standard Gaussian or Rademacher random variables. This result confirms a conjecture of O. Nguyen from 2019. More generally, our main results also describe several statistical properties for the number of real roots of fn, including the asymptotic behavior of the variance and a central limit theorem.

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