English

Adaptive approximation by optimal weighted least squares methods

Numerical Analysis 2019-07-11 v2 Numerical Analysis

Abstract

Given any domain XRdX\subseteq \mathbb{R}^d and a probability measure ρ\rho on XX, we study the problem of approximating in L2(X,ρ)L^2(X,\rho) a given function u:XRu:X\to\mathbb{R}, using its noiseless pointwise evaluations at random samples. For any given linear space VL2(X,ρ)V\subset L^2(X,\rho) with dimension nn, previous works have shown that stable and optimally converging Weighted Least-Squares (WLS) estimators can be constructed using mm random samples distributed according to an auxiliary probability measure μ\mu that depends on VV, with mm being linearly proportional to nn up to a logarithmic term. As a first contribution, we present novel results on the stability and accuracy of WLS estimators with a given approximation space, using random samples that are more structured than those used in the previous analysis. As a second contribution, we study approximation by WLS estimators in the adaptive setting. For any sequence of nested spaces (Vk)kL2(X,ρ)(V_k)_{k} \subset L^2(X,\rho), we show that a sequence of WLS estimators of uu, one for each space VkV_k, can be sequentially constructed such that: i) the estimators remain provably stable with high probability and optimally converging in expectation, simultaneously for all iterations from one to kk, and ii) the overall number of samples necessary to construct all the first kk estimators remains linearly proportional to the dimension of VkV_k. We propose two sampling algorithms that achieve this goal. The first one is a purely random algorithm that recycles most of the samples from the previous iterations. The second algorithm recycles all the samples from all the previous iterations. Such an achievement is made possible by crucially exploiting the structure of the random samples. Finally we develop numerical methods for the adaptive approximation of functions in high dimension.

Keywords

Cite

@article{arxiv.1807.00402,
  title  = {Adaptive approximation by optimal weighted least squares methods},
  author = {Giovanni Migliorati},
  journal= {arXiv preprint arXiv:1807.00402},
  year   = {2019}
}

Comments

the version of the manuscript accepted for publication

R2 v1 2026-06-23T02:47:31.605Z