Low distortion embeddings into Asplund Banach spaces
Abstract
We give a simple example of a countable metric space M that does not embed bi-Lipschitz with distortion strictly less than 2 into any Asplund space. Actually, if M embeds with distortion strictly less than 2 to a Banach space X, then X contains an isomorphic copy of 1. We also show that the space M does not embed with distortion strictly less than 2 into 1 itself but it does embed isometrically into a space that is isomorphic to 1.
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