Anti-concentration of polynomials: Lp balls and symmetric measures
Abstract
We begin with the observation, based on previous results, that dimension-free lower bounds on the variance of a polynomial under a log-concave measure yield dimension-free small-ball and Fourier decay estimates. Motivated by this, we establish variance bounds for polynomials on log-concave random vectors beyond the classical setting of product measures. First, we consider the family of uniform measures on the n-dimensional isotropic Lp balls. We show that for a degree-d homogeneous polynomial f=ΣIaIxI, with ΣIaI2=1, the only obstruction to a dimension-free lower bound on its variance occurs when p=d is an even integer and the coefficients of f are close to those of 1n x pp. Second, we consider general isotropic log-concave measures that are invariant under coordinate permutations and reflections, and determine the minimal variance for quadratic and cubic polynomials. These variance bounds lead to new dimension-free anti-concentration results in both settings, addressing a natural extension of a question posed by Carbery and Wright.
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