Gain coefficients for scrambled Halton points
Numerical Analysis
2023-08-17 v1 Numerical Analysis
Computation
Abstract
Randomized quasi-Monte Carlo, via certain scramblings of digital nets, produces unbiased estimates of with a variance that is for any . It also satisfies some non-asymptotic bounds where the variance is no larger than some times the ordinary Monte Carlo variance. For scrambled Sobol' points, this quantity grows exponentially in . For scrambled Faure points, in any dimension, but those points are awkward to use for large . This paper shows that certain scramblings of Halton sequences have gains below an explicit bound that is but not for any as . For , the upper bound on the gain coefficient is never larger than .
Cite
@article{arxiv.2308.08035,
title = {Gain coefficients for scrambled Halton points},
author = {Art B. Owen and Zexin Pan},
journal= {arXiv preprint arXiv:2308.08035},
year = {2023}
}