Approximation schemes satisfying Shapiro's Theorem

Abstract

An approximation scheme is a family of homogeneous subsets (An) of a quasi-Banach space X, such that A1 ⊂neq A2 ⊂neq ... ⊂neq X, An + An ⊂ AK(n), and n An = X. 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 \εn\ 0, there exists x∈ X such that dist(x,An)≠ O(εn) (in this case we say that (X,\An\) satisfies Shapiro's Theorem). If X is a Banach space, x ∈ X as above exists if and only if, for every sequence \δn\ 0, there exists y ∈ X such that dist(y,An) ≥ δn. We give numerous examples of approximation schemes satisfying Shapiro's Theorem.