Shapiro's Theorem for subspaces
Classical Analysis and ODEs
2011-08-30 v2
Abstract
In a previous paper (see arXiv:1003.3411 [math.CA]), we investigated the existence of an element x of a quasi-Banach space X whose errors of best approximation by a given approximation scheme (A_n) (defined by E(x,A_n) = \inf_{a \in A_n} \|x - a_n\|) decay arbitrarily slowly. In this work, we consider the question of whether x witnessing the slowness rate of approximation can be selected in a prescribed subspace of X. In many particular cases, the answer turns out to be positive.
Cite
@article{arxiv.1009.5535,
title = {Shapiro's Theorem for subspaces},
author = {J. M. Almira and T. Oikhberg},
journal= {arXiv preprint arXiv:1009.5535},
year = {2011}
}
Comments
35 pages, submitted to a Journal