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TIT
2008

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Geometric Upper Bounds on Rates of Variable-Basis Approximation

13 years 4 months ago

Geometric Upper Bounds on Rates of Variable-Basis Approximation

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In this paper, approximation by linear combinations of an increasing number n of computational units with adjustable parameters (such as perceptrons and radial basis functions) is investigated. Geometric upper bounds on rates of convergence of approximation errors are derived. The bounds depend on certain parameters specific for each function to be approximated. The results are illustrated by examples of values of such parameters in the case of approximation by linear combinations of orthonormal functions.

Vera Kurková, Marcello Sanguineti

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Approximation | Linear Combinations | Radial Basis Functions | TIT 2008 |

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Added	15 Dec 2010
Updated	15 Dec 2010
Type	Journal
Year	2008
Where	TIT
Authors	Vera Kurková, Marcello Sanguineti

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