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dc.contributor.authorGirosi, Federicoen_US
dc.contributor.authorAnzellotti, Gabrieleen_US
dc.date.accessioned2004-11-04T16:53:30Z
dc.date.available2004-11-04T16:53:30Z
dc.date.issued1992-03-01en_US
dc.identifier.otherAIM-1288en_US
dc.identifier.urihttp://hdl.handle.net/1721.1/7316
dc.description.abstractIn this paper we consider the problem of approximating a function belonging to some funtion space Φ by a linear comination of n translates of a given function G. Ussing a lemma by Jones (1990) and Barron (1991) we show that it is possible to define function spaces and functions G for which the rate of convergence to zero of the erro is 0(1/n) in any number of dimensions. The apparent avoidance of the "curse of dimensionality" is due to the fact that these function spaces are more and more constrained as the dimension increases. Examples include spaces of the Sobolev tpe, in which the number of weak derivatives is required to be larger than the number of dimensions. We give results both for approximation in the L2 norm and in the Lc norm. The interesting feature of these results is that, thanks to the constructive nature of Jones" and Barron"s lemma, an iterative procedure is defined that can achieve this rate.en_US
dc.format.extent77663 bytes
dc.format.extent329320 bytes
dc.format.mimetypeapplication/octet-stream
dc.format.mimetypeapplication/pdf
dc.language.isoen_US
dc.relation.ispartofseriesAIM-1288en_US
dc.titleConvergence Rates of Approximation by Translatesen_US


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