Property (M), M-ideals, and almost isometric structure of Banach spaces
Abstract
We study M-ideals of compact operators by means of the property~(M) introduced in Kal-M. Our main result states for a separable Banach space X that the space of compact operators on X is an M-ideal in the space of bounded operators if (and only if) X does not contain a copy of 1, has the metric compact approximation property, and has property~(M). The investigation of special versions of property~(M) leads to results on almost isometric structure of some classes of Banach spaces. For instance, we give a simple necessary and sufficient condition for a Banach space to embed almost isometrically into an p-sum of finite-dimensional spaces resp.\ into c0, and for 2<p< we prove that a subspace of Lp embeds almost isometrically into p if and only if it does not contain a subspace isomorphic to 2.
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