In this talk we provide a necessary and sufficient condition for the horofunction extension of a metric space to be a compactification. The condition clarifies previous results on proper metric spaces and geodesic spaces and yields the following characterization: a Banach space is Gromov-compactifiable under any renorming if and only if it does not contain an isomorphic copy of ℓ1 . In addition, it is shown that, up to an adequate renorming, every Banach space is Gromov-compactifiable. Therefore, the property of being Gromov-compactifiable is not invariant under bi-Lipschitz equivalence.
This is a joint work with A. Daniilidis, M.I. Garrido and J. Jaramillo.