Hypercontractivity Meets Random Convex Hulls: Analysis of Randomized Multivariate Cubatures

Abstract

Given a probability measure μ on a set X and a vector-valued function , a common problem is to construct a discrete probability measure on X such that the push-forward of these two probability measures under is the same. This construction is at the heart of numerical integration methods that run under various names such as quadrature, cubature, or recombination. A natural approach is to sample points from μ until their convex hull of their image under includes the mean of . Here we analyze the computational complexity of this approach when exhibits a graded structure by using so-called hypercontractivity. The resulting theorem not only covers the classical cubature case of multivariate polynomials, but also integration on pathspace, as well as kernel quadrature for product measures.