Sample numbers and optimal Lagrange interpolation of Sobolev spaces \(W_1^r\)
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Publication:2047226
DOI10.1007/s11401-021-0275-4zbMath1471.41004OpenAlexW3187420131MaRDI QIDQ2047226
Hui Wang, Zehong Liu, Gui Qiao Xu
Publication date: 19 August 2021
Published in: Chinese Annals of Mathematics. Series B (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/s11401-021-0275-4
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Complexity of Monte Carlo integration for Besov classes on the unit sphere ⋮ Optimal Birkhoff interpolation and Birkhoff numbers in some function spaces
Cites Work
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- Sampling on energy-norm based sparse grids for the optimal recovery of Sobolev type functions in \(H^\gamma\)
- Sampling and cubature on sparse grids based on a B-spline quasi-interpolation
- Optimal adaptive sampling recovery
- B-spline quasi-interpolant representations and sampling recovery of functions with mixed smoothness
- Function spaces in Lipschitz domains and optimal rates of convergence for sampling
- Optimal recovery of Besov classes of generalized smoothness and Sobolev classes on the sphere
- Tractability of multivariate problems. Volume I: Linear information
- Bases in function spaces, sampling, discrepancy, numerical integration
- Optimal sampling recovery of mixed order Sobolev embeddings via discrete {L}ittlewood--{P}aley type characterizations
- B-spline quasi-interpolation sampling representation and sampling recovery in Sobolev spaces of mixed smoothness
- Sample numbers and optimal Lagrange interpolation in Sobolev spaces
- Hyperbolic cross approximation. Lecture notes given at the courses on constructive approximation and harmonic analysis, Barcelona, Spain, May 30 -- June 3, 2016
- Optimal interpolation formulas in the space \(W_2^{(m,m-1)}\)
- Tight error bounds for rank-1 lattice sampling in spaces of hybrid mixed smoothness
- Sampling numbers and function spaces
- On node distributions for interpolation and spectral methods
- The best accuracy of reconstruction of finitely smooth functions from their values at a given number of points
- Multivariate Approximation
- The first Zolotarev case in the Erdös-Szegö solution to a Markov-type extremal problem of Schur
- Optimal systems of nodes for Lagrange interpolation on bounded intervals. A survey
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