Estimates for the entropy numbers of the Nikol'skii–Besov classes of functions with mixed smoothness in the space of quasi‐continuous functions
DOI10.1002/mana.202100202OpenAlexW4360989894MaRDI QIDQ6047370
A. S. Romanyuk, Unnamed Author
Publication date: 9 October 2023
Published in: Mathematische Nachrichten (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1002/mana.202100202
entropy numbersdominating mixed smoothnessNikol'skii-Besov classesspace of quasi-continuous functions
Trigonometric approximation (42A10) Fourier and Fourier-Stieltjes transforms and other transforms of Fourier type (42B10) Approximation by arbitrary nonlinear expressions; widths and entropy (41A46)
Cites Work
- An inequality for the entropy numbers and its application
- On the entropy numbers of the mixed smoothness function classes
- Spaces of functions of mixed smoothness from the decomposition point of view
- Estimates of entropy numbers and Gaussian measures for classes of functions with bounded mixed derivative
- On a certain norm and related applications
- Metric entropy and the small ball problem for Gaussian measures
- The small ball problem for the Brownian sheet
- Approximation, metric entropy and small ball estimates for Gaussian measures
- Estimation of the entropy numbers and Kolmogorov widths for the Nikol'skii-Besov classes of periodic functions of many variables
- Entropy numbers and widths for the classes \(B_{p,\theta}^r\) of periodic functions of many variables
- An inequality for trigonometric polynomials and its application for estimating the entropy numbers
- On best \(m\)-term approximations and the entropy of sets in the space \(L^ 1\)
- Estimate of approximate characteristics for classes of functions with bounded mixed derivative
- Metric entropy of integration operators and small ball probabilites for the Brownian sheet
- Hyperbolic cross approximation. Lecture notes given at the courses on constructive approximation and harmonic analysis, Barcelona, Spain, May 30 -- June 3, 2016
- Approximation of functions with small mixed smoothness in the uniform norm
- Entropy numbers of the Nikol'skii-Besov-type classes of periodic functions of many variables
- Approximating characteristics of the classes of periodic multivariate functions in the space \(B_{ \infty , 1} \)
- Estimates for the entropy numbers of the classes \( {B}_{p,\theta}^{\Omega } \) of periodic multivariable functions in the uniform metric
- Entropy numbers and widths for the Nikol'skii-Besov classes of functions of many variables in the space $L_{\infty}$
- Approximation of functions of several variables by trigonometric polynomials with given number of harmonics, and estimates of \(\epsilon\)- entropy
- Entropy numbers of finite dimensional mixed-norm balls and function space embeddings with small mixed smoothness
- On nonequivalence of the C- and QC-norms in the space of trigonometric polynomials
- Multivariate Approximation
- Some trigonometric polynomials with extremely small uniform norm and their applications
- Some properties of the space of quasi-continuous functions
- Function spaces with dominating mixed smoothness
- Nonlinear approximations using sets of finite cardinality or finite pseudo-dimension
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