Subsymmetric bases have the factorization property (2011.09915v1)

Abstract: We show that every subsymmetric Schauder basis $(e_j)$ of a Banach space $X$ has the factorization property, i.e. $I_X$ factors through every bounded operator $T\colon X\to X$ with a $\delta$-large diagonal (that is $\inf_j |\langle Te_j, e_j^*\rangle| \geq \delta > 0$, where the $(e_j^*)$ are the biorthogonal functionals to $(e_j)$). Even if $X$ is a non-separable dual space with a subsymmetric weak$^*$ Schauder basis $(e_j)$, we prove that if $(e_j)$ is non-$\ell^1$-splicing (there is no disjointly supported $\ell^1$-sequence in $X$), then $(e_j)$ has the factorization property. The same is true for $\ell^p$-direct sums of such Banach spaces for all $1\leq p\leq \infty$. Moreover, we find a condition for an unconditional basis $(e_j){j=1}^n$ of a Banach space $X_n$ in terms of the quantities $|e_1+\ldots+e_n|$ and $|e_1^+\ldots+e_n^|$ under which an operator $T\colon X_n\to X_n$ with $\delta$-large diagonal can be inverted when restricted to $X\sigma = [e_j : j\in\sigma]$ for a "large" set $\sigma\subset {1,\ldots,n}$ (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 $\delta$-large diagonal defined on any space $X_n$ with a subsymmetric basis $(e_j)$ can be inverted on $X_\sigma$ for some $\sigma$ with $|\sigma|\geq c n^{1/4}$.