Quotient algebra of compact-by-approximable operators on Banach spaces failing the approximation property

Abstract

We initiate a study of structural properties of the quotient algebra K(X)/ A(X) of the compact-by-approximable operators on Banach spaces X failing the approximation property. Our main results and examples include the following: (i) there is a linear isomorphic embedding from c0 into K(Z)/ A(Z), where Z belongs to the class of Banach spaces constructed by Willis that have the metric compact approximation property but fail the approximation property, (ii) there is a linear isomorphic embedding from a non-separable space c0() into K(ZFJ)/ A(ZFJ), where ZFJ is a universal compact factorisation space arising from the work of Johnson and Figiel.