Polynomial bounds for decoupling, with applications

Abstract

Let f(x) = f(x1, ..., xn) = Σ|S| <= k aS Πi ∈ S xi be an n-variate real multilinear polynomial of degree at most k, where S ⊂eq [n] = 1, 2, ..., n. For its "one-block decoupled" version, f~(y,z) = Σ|S| <= k aS Σi ∈ S yi Πj ∈ S zj, we show tail-bound comparisons of the form Pr[|f~(y,z)| > Ck t] <= Dk Pr[f(x) > t]. Our constants Ck, Dk are significantly better than those known for "full decoupling". For example, when x, y, z are independent Gaussians we obtain Ck = Dk = O(k); when x, y, z, Rademacher random variables we obtain Ck = O(k2), Dk = kO(k). By contrast, for full decoupling only Ck = Dk = kO(k) is known in these settings. We describe consequences of these results for query complexity (related to conjectures of Aaronson and Ambainis) and for analysis of Boolean functions (including an optimal sharpening of the DFKO Inequality).