Bernstein Lethargy Theorem and Reflexivity
Abstract
In this paper, we prove the equivalence of reflexive Banach spaces and those Banach spaces which satisfy the following form of Bernstein's Lethargy Theorem. Let X be an arbitrary infinite-dimensional Banach space, and let the real-valued sequence \dn\n1 decrease to 0. Suppose that \Yn\n1 is a system of strictly nested subspaces of X such that Yn ⊂ Yn+1 for all n1 and for each n1, there exists yn∈ Yn+1 Yn such that the distance (yn,Yn) from yn to the subspace Yn satisfies (yn,Yn)=\|yn\|. Then, there exists an element x∈ X such that (x,Yn)=dn for all n1.
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