The completion of the hyperspace of finite subsets, endowed with the 1-metric

Abstract

For a metric space X, let FX be the space of all nonempty finite subsets of X endowed with the largest metric d1 FX such that for every n∈ N the map Xn FX, (x1,…,xn) \x1,…,xn\, is non-expanding with respect to the 1-metric on Xn. We study the completion of the metric space F1\!X=( FX,d1 FX) and prove that it coincides with the space Z1\!X of nonempty compact subsets of X that have zero length (defined with the help of graphs). We prove that each subset of zero length in a metric space has 1-dimensional Hausdorff measure zero. A subset A of the real line has zero length if and only if its closure is compact and has Lebesgue measure zero. On the other hand, for every n 2 the Euclidean space Rn contains a compact subset of 1-dimensional Hausdorff measure zero that fails to have zero length.