Constructing an Element of a Banach Space with Given Deviation from its Nested Subspaces

Abstract

This paper contains two improvements on a theorem of S. N. Bernstein for Banach spaces. We show that if X is an arbitrary infinite-dimensional Banach space, \Yn\ is a sequence of strictly nested subspaces of X and if \dn\ is a non-increasing sequence of non-negative numbers tending to 0, then for any c∈(0,1] we can find xc ∈ X, such that the distance (xc, Yn) from xc to Yn satisfies c dn ≤ (xc,Yn) ≤ 4c dn,~for all n∈ N. We prove the above inequality by first improving Borodin (2006)'s result for Banach spaces by weakening his condition on the sequence \dn\. The weakened condition on dn requires refinement of Borodin's construction to extract an element in X, whose distances from the nested subspaces are precisely the given values dn.