Subsymmetric bases have the factorization property

Abstract

We show that every subsymmetric Schauder basis (ej) of a Banach space X has the factorization property, i.e. IX factors through every bounded operator T X X with a δ-large diagonal (that is ∈fj | Tej, ej*| ≥ δ > 0, where the (ej*) are the biorthogonal functionals to (ej)). Even if X is a non-separable dual space with a subsymmetric weak* Schauder basis (ej), we prove that if (ej) is non-1-splicing (there is no disjointly supported 1-sequence in X), then (ej) has the factorization property. The same is true for p-direct sums of such Banach spaces for all 1≤ p≤ ∞. Moreover, we find a condition for an unconditional basis (ej)j=1n of a Banach space Xn in terms of the quantities \|e1+…+en\| and \|e1*+…+en*\| under which an operator T Xn Xn with δ-large diagonal can be inverted when restricted to Xσ = [ej : j∈σ] for a "large" set σ⊂ \1,…,n\ (restricted invertibility of T; see Bourgain and Tzafriri [Israel J. Math. 1987, London Math. Soc. Lecture Note Ser. 1989). We then apply this result to subsymmetric bases to obtain that operators T with a δ-large diagonal defined on any space Xn with a subsymmetric basis (ej) can be inverted on Xσ for some σ with |σ|≥ c n1/4.