New Weak Error bounds and expansions for Optimal Quantization
Abstract
We propose new weak error bounds and expansion in dimension one for optimal quantization-based cubature formula for different classes of functions, such that piecewise affine functions, Lipschitz convex functions or differentiable function with piecewise-defined locally Lipschitz or -H\"older derivatives. This new results rest on the local behaviors of optimal quantizers, the - distribution mismatch problem and Zador's Theorem. This new expansion supports the definition of a Richardson-Romberg extrapolation yielding a better rate of convergence for the cubature formula. An extension of this expansion is then proposed in higher dimension for the first time. We then propose a novel variance reduction method for Monte Carlo estimators, based on one dimensional optimal quantizers.
Cite
@article{arxiv.1903.10330,
title = {New Weak Error bounds and expansions for Optimal Quantization},
author = {Vincent Lemaire and Thibaut Montes and Gilles Pagès},
journal= {arXiv preprint arXiv:1903.10330},
year = {2022}
}