Random Bernstein–Markov factors

Abstract: For a polynomial P n of degree n, Bernstein's inequality states that P ′ n ≤ n P n for all L p norms on the unit circle, 0 < p ≤ ∞, with equality for P n (z) = cz n . We study this inequality for random polynomials, and show that the expected (average) and almost sure value of P ′ n / P n is often different from the classical deterministic upper bound n. In particular, for circles of radii less than one, the ratio P ′ n / P n is almost surely bounded as n tends to infinity, and its expected value is uniformly … Show more