English

Universal sampling discretization

Functional Analysis 2021-07-27 v1 Numerical Analysis Classical Analysis and ODEs Numerical Analysis

Abstract

Let XNX_N be an NN-dimensional subspace of L2L_2 functions on a probability space (Ω,μ)(\Omega, \mu) spanned by a uniformly bounded Riesz basis ΦN\Phi_N. Given an integer 1vN1\leq v\leq N and an exponent 1q21\leq q\leq 2, we obtain universal discretization for integral norms Lq(Ω,μ)L_q(\Omega,\mu) of functions from the collection of all subspaces of XNX_N spanned by vv elements of ΦN\Phi_N with the number mm of required points satisfying mv(logN)2(logv)2m\ll v(\log N)^2(\log v)^2. This last bound on mm is much better than previously known bounds which are quadratic in vv. Our proof uses a conditional theorem on universal sampling discretization, and an inequality of entropy numbers in terms of greedy approximation with respect to dictionaries.

Keywords

Cite

@article{arxiv.2107.11476,
  title  = {Universal sampling discretization},
  author = {Feng Dai and V. Temlyakov},
  journal= {arXiv preprint arXiv:2107.11476},
  year   = {2021}
}
R2 v1 2026-06-24T04:28:43.286Z