F. Dai, V. N. Temlyakov, “Universal Sampling Discretization”, Constructive Approximation, 2023, Volume 58, Pages 589

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Constructive Approximation, 2023, Volume 58, Pages 589–613
DOI: https://doi.org/10.1007/s00365-023-09644-2 (Mi conap11)

This article is cited in 6 scientific papers (total in 6 papers)

Universal Sampling Discretization

F. Dai^a, V. N. Temlyakov^bcde

^a Department of Mathematical and Statistical Sciences, University of Alberta, Edmonton, Alberta, T6G 2G1, Canada
^b University of South Carolina, Columbia, USA
^c Steklov Institute of Mathematics, Moscow, Russia
^d Lomonosov Moscow State University, Moscow, Russia
^e Moscow Center for Fundamental and Applied Mathematics, Moscow, Russia

Citations (6)

DOI: https://doi.org/10.1007/s00365-023-09644-2

Abstract: Let

X_{N}

$X_N$ be an

N

$N$ -dimensional subspace of

L_{2}

$L_2$ functions on a probability space

(Ω, μ)

$(\Omega , \mu )$ spanned by a uniformly bounded Riesz basis

Φ_{N}

$\Phi _N$ . Given an integer

$1\le v\le N$ and an exponent

$1\le p\le 2$ , we obtain universal discretization for the integral norms

$L_p(\Omega ,\mu )$ of functions from the collection of all subspaces of

$X_N$ spanned by

$v$ elements of

$\Phi _N$ with the number

$m$ of required points satisfying

$m\ll v(\log N)^2(\log v)^2$ . This last bound on

$m$ is much better than previously known bounds which are quadratic in

$v$ . 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.

Funding agency	Grant number
Natural Sciences and Engineering Research Council of Canada (NSERC)	RGPIN-2020-03909
Ministry of Education and Science of the Russian Federation	14.W03.31.0031
The first named author's research was partially supported by NSERC of Canada Discovery Grant RGPIN-2020-03909. The second named author’s research wa s supported by the Russian Federation Government Grant No. 14.W03.31.0031.

Received: 25.04.2023

Bibliographic databases:

Document Type: Article

MSC: Primary 65J05; Secondary 42A05; 65D30; 41A63

Language: English

Linking options:

https://www.mathnet.ru/eng/conap11

This publication is cited in the following 6 articles:

Ben Adcock, Simone Brugiapaglia, Nick Dexter, Sebastian Moraga, Handbook of Numerical Analysis, 25, Numerical Analysis Meets Machine Learning, 2024, 1
Angelica Sunshine Onarse Ayala, Roel P. Villocino, “School Leadership Behavior and Job Satisfaction Among Multi-Grade Teachers”, International Journal of Innovative Science and Research Technology (IJISRT), 2024, 341
V. N. Temlyakov, “Sparse sampling recovery in integral norms on some function classes”, Mat. Sb., 215:10 (2024), 146–166
V. N. Temlyakov, “Sparse sampling recovery in integral norms on some function classes”, Sb. Math., 215:10 (2024), 1406–1425
V. N. Temlyakov, “On Universal Sampling Recovery in the Uniform Norm”, Proc. Steklov Inst. Math., 323 (2023), 206–216
D. Freeman, T. Oikhberg, B. Pineau, M. A. Taylor, “Stable phase retrieval in function spaces”, Math. Ann., 2023

Citing articles in Google Scholar: Russian citations, English citations
Related articles in Google Scholar: Russian articles, English articles

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