Remarks on Banach spaces determined by their finite dimensional subspaces

Abstract

A separable Banach space X is said to be finitely determined if for each separable space Y such that X is finitely representable (f.r.) in Y and Y is f.r. in X then Y is isometric to X. We provide a direct proof (without model theory) of the fact that every finitely determined space X (isometrically) contains every (separable) space Y which is finitely representable in X. We also point out how a similar argument proves the Krivine-Maurey theorem on stable Banach spaces, and give the model theoretic interpretations of some results.