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deleted 4 characters in body; edited title

edited Sep 5, 2019 at 11:38

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Existence of a Hölder-free space

The Lipschitz-free or Arens-Eells space over a pointed separable metric space $(X,0,d)$ is a well-studied object. My question is, is an analogos Hölder-free space; for a fixed Hölder constant $\alpha>0$?

asked Sep 5, 2019 at 11:09

ABIM

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