English

Sampling, Metric Entropy and Dimensionality Reduction

Classical Analysis and ODEs 2013-08-14 v1

Abstract

Let QQ be a relatively compact subset in a Hilbert space VV. For a given \e>0\e>0 let N(\e,Q)N(\e,Q) be the minimal number of linear measurements, sufficient to reconstruct any xQx \in Q with the accuracy \e\e. We call N(\e,Q)N(\e,Q) a sampling \e\e-entropy of QQ. Using Dimensionality Reduction, as provided by the Johnson-Lindenstrauss lemma, we show that, in an appropriate probabilistic setting, N(\e,Q)N(\e,Q) is bounded from above by the Kolmogorov's \e\e-entropy H(\e,Q)H(\e,Q), defined as H(\e,Q)=logM(\e,Q)H(\e,Q)=\log M(\e,Q), with M(\e,Q)M(\e,Q) being the minimal number of \e\e-balls covering QQ. As the main application, we show that piecewise smooth (piecewise analytic) functions in one and several variables can be sampled with essentially the same accuracy rate as their regular counterparts. For univariate piecewise CkC^k-smooth functions this result, which settles the so-called Eckhoff conjecture, was recently established in \cite{Bat} via a deterministic "algebraic reconstruction" algorithm.

Keywords

Cite

@article{arxiv.1308.2781,
  title  = {Sampling, Metric Entropy and Dimensionality Reduction},
  author = {D. Batenkov and O. Friedland and Y. Yomdin},
  journal= {arXiv preprint arXiv:1308.2781},
  year   = {2013}
}
R2 v1 2026-06-22T01:08:28.510Z