Subspace Condition for Bernstein's Lethargy Theorem

Abstract

In this paper, we consider a condition on subspaces in order to improve bounds given in the Bernstein's Lethargy Theorem (BLT) for Banach spaces. Let d1 ≥ d2 ≥ … dn ≥ … > 0 be an infinite sequence of numbers converging to 0, and let Y1 ⊂ Y2 ⊂ …⊂ Yn ⊂ … ⊂ X be a sequence of closed nested subspaces in a Banach space X with the property that Yn⊂ Yn+1 for all n1. We prove that for any c ∈ (0,1], there exists an element xc ∈ X such that c dn ≤ (xc, Yn) ≤ (4, a) c\, dn. Here, (x, Yn)= ∈f \ ||x-y||: \,\,y∈ Yn\, a =i1 \ qi \ \ ani+1-1-3 \ where the sequence \an\ is defined as: for all n ≥ 1 , an = ∈fl ≥ n \, ∈fq ∈ ql, ql+1,… (q,Yl)||q|| in which each point qn is taken from Yn+1 Yn, and satisfies ∈fn1 an > 0. The sequence \ni\i1 is given by %Theorem 100, \ni\ satisfying (ni) and ni≤ n<ni+1. n1=1;~ni+1= \ n1 : dnan2 ≤ dni \,~i≥ 1.