Super-polynomial accuracy of one dimensional randomized nets using the median-of-means

Abstract

Let f be analytic on [0,1] with |f(k)(1/2)|≤ Aαkk! for some constant A and α<2. We show that the median estimate of μ=∫01f(x)\,dx under random linear scrambling with n=2m points converges at the rate O(n-c(n)) for any c< 3(2)/π2≈ 0.21. We also get a super-polynomial convergence rate for the sample median of 2k-1 random linearly scrambled estimates, when k=(m). When f has a p'th derivative that satisfies a λ-H\"older condition then the median-of-means has error O( n-(p+λ)+ε) for any ε>0, if k∞ as m∞.