Adaptive algorithms in sampling recovery
Abstract
We study optimal algorithms in adaptive sampling recovery of smooth functions defined on the unit -cube . The recovery error is measured in the quasi-norm of . For a subset in we define a sampling algorithm of recovery with the free choice of sample points and recovering functions from as follows. For each from the quasi-normed Besov space , we choose sample points. This choice defines sampled values. Based on these sample points and sampled values, we choose a function from for recovering . The choice of sample points and a recovering function from for each defines a -sampling algorithm by functions in . If is a family of elements in , let be the non-linear set of linear combinations of free terms from that is . Denote by the set of all families in such that the intersection of with any finite dimensional subspace in is a finite set, and by the set of all continuous mappings from into . We define the quantity Let and . Then we prove the asymptotic order We also obtained the asymptotic order of quantities of optimal recovery by in terms of best -term approximation as well of other non-linear -widths.
Cite
@article{arxiv.1102.3540,
title = {Adaptive algorithms in sampling recovery},
author = {Dinh Dũng},
journal= {arXiv preprint arXiv:1102.3540},
year = {2011}
}