Approximation schemes satisfying Shapiro's Theorem
Abstract
An approximation scheme is a family of homogeneous subsets of a quasi-Banach space , such that , , and . Continuing the line of research originating at a classical paper by S.N. Bernstein (in 1938), we give several characterizations of the approximation schemes with the property that, for every sequence , there exists such that (in this case we say that satisfies Shapiro's Theorem). If is a Banach space, as above exists if and only if, for every sequence , there exists such that . We give numerous examples of approximation schemes satisfying Shapiro's Theorem.
Cite
@article{arxiv.1003.3411,
title = {Approximation schemes satisfying Shapiro's Theorem},
author = {J. M. Almira and T. Oikhberg},
journal= {arXiv preprint arXiv:1003.3411},
year = {2010}
}
Comments
41 pages, Submitted to a Journal. A natural continuation of this paper is also downloadable at Arxiv: See J. M. Almira and T. Oikhberg, "Shapiro's theorem for Subspaces", at arXiv:1009.5535v1