The Hausdorff Mapping Is Nonexpanding

In the present paper we investigate the properties of the Hausdorff mapping \(\mathcal{H}\), which takes each compact metric space to the space of its nonempty closed subspaces. It is shown that this mapping is nonexpanding (Lipschitz mapping with constant \(1\)). This paper gives several examples of classes of metric spaces, distances between which are preserved by the mapping \(\mathcal{H}\). We also calculate distance between any connected metric space and any simplex with greater diameter than the former one. At the end of the paper we discuss some properties of the Hausdorff mapping which may help to prove that it is isometric