Compactness and an approximation property related to an operator ideal

Abstract

For an operator ideal A, we study the composition operator ideals A K, K A and K A K, where K is the ideal of compact operators. We introduce a notion of an A-approximation property on a Banach space and characterise it in terms of the density of finite rank operators in A K and K A. We propose the notions of ∞-extension and 1-lifting properties for an operator ideal A and study A K, A and the A-approximation property where A is injective or surjective and/or with the ∞-extension or 1-lifting property. In particular, we show that if A is an injective operator ideal with the ∞-extension property, then we have: (a) X has the A-approximation property if and only if ( Amin)inj(Y,X)= Amin(Y,X), for all Banach spaces Y. (b) The dual space X* has the A-approximation property if and only if (( Adual)min)sur(X,Y)=( Adual)min(X,Y), for all Banach spaces Y.For an operator ideal A, we study the composition operator ideals A K,