Function Values Are Enough for L2-Approximation

We study the L 2 -approximation of functions from a Hilbert space and compare the sampling numbers with the approximation numbers. The sampling number e n is the minimal worst-case error that can be achieved with n function values, whereas the approximation number a n is the minimal worst-case error...

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Veröffentlicht in:Foundations of computational mathematics Jg. 21; H. 4; S. 1141 - 1151
Hauptverfasser: Krieg, David, Ullrich, Mario
Format: Journal Article
Sprache:Englisch
Veröffentlicht: New York Springer US 01.08.2021
Springer Nature B.V
Schlagworte:
Algorithms
Applications of Mathematics
Approximation
Computer Science
Economics
Hilbert space
Linear and Multilinear Algebras
Math Applications in Computer Science
Mathematical analysis
Mathematics
Mathematics and Statistics
Matrix Theory
Numerical Analysis
Polynomials
Sampling
Smoothness
Sobolev space
approximation
Random matrices
41A46
41A25
46E35
Secondary: 41A63
60B20
Sobolev spaces with mixed smoothness
Rate of convergence
Sampling numbers
ISSN:1615-3375, 1615-3383
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Zusammenfassung:We study the L 2 -approximation of functions from a Hilbert space and compare the sampling numbers with the approximation numbers. The sampling number e n is the minimal worst-case error that can be achieved with n function values, whereas the approximation number a n is the minimal worst-case error that can be achieved with n pieces of arbitrary linear information (like derivatives or Fourier coefficients). We show that e n ≲ 1 k n ∑ j ≥ k n a j 2 , where k n ≍ n / log ( n ) . This proves that the sampling numbers decay with the same polynomial rate as the approximation numbers and therefore that function values are basically as powerful as arbitrary linear information if the approximation numbers are square-summable. Our result applies, in particular, to Sobolev spaces H mix s ( T d ) with dominating mixed smoothness s > 1 / 2 and dimension d ∈ N , and we obtain e n ≲ n - s log sd ( n ) . For d > 2 s + 1 , this improves upon all previous bounds and disproves the prevalent conjecture that Smolyak’s (sparse grid) algorithm is optimal.
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ISSN:1615-3375
1615-3383
DOI:10.1007/s10208-020-09481-w