On the Bounded Approximation Property in Banach spaces

Abstract

We prove that the kernel of a quotient operator from an L1-space onto a Banach space X with the Bounded Approximation Property (BAP) has the BAP. This completes earlier results of Lusky --case 1-- and Figiel, Johnson and Pe czy\'nski --case X* separable. Given a Banach space X, we show that if the kernel of a quotient map from some L1-space onto X has the BAP then every kernel of every quotient map from any L1-space onto X has the BAP. The dual result for L∞-spaces also hold: if for some L∞-space E some quotient E/X has the BAP then for every L∞-space E every quotient E/X has the BAP.