Karim Khanaki
Published 2018-04-20Version 1
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.
Comments: The primary classification for this submission is Functional Analysis. This paper is companion-piece to arXiv:1603.08134 Comments are welcome (K.Khanaki@gmail.com)
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