Almost Auerbach, Markushevich and Schauder bases in Hilbert and Banach spaces

Abstract

For any sequence of positive numbers (n)n=1∞ such that Σn=1∞ n = ∞ we provide an explicit simple construction of (1+n)-bounded Markushevich basis in a separable Hilbert space which is not strong, or, in other terminology, is not hereditary complete; this condition on the sequence (n)n=1∞ is sharp. Using a finite-dimensional version of this construction, Dvoretzky's theorem and a construction of Vershynin, we conclude that in any Banach space for any sequence of positive numbers (n)n=1∞ such that Σn=1∞ n2 = ∞ there exists a (1+n)-bounded Markushevich basis which is not a Schauder basis after any permutation of its elements.