Bernstein-like Concentration and Moment Inequalities for Polynomials of Independent Random Variables: Multilinear Case

Abstract

We show that the probability that a multilinear polynomial f of independent random variables exceeds its mean by λ is at most e-λ2 / (Rq Var(f)) for sufficiently small λ, where R is an absolute constant. This matches (up to constants in the exponent) what one would expect from the central limit theorem. Our methods handle a variety of types of random variables including Gaussian, Boolean, exponential, and Poisson. Previous work by Kim-Vu and Schudy-Sviridenko gave bounds of the same form that involved less natural parameters in place of the variance.