On relations between transportation cost spaces and 1

Abstract

The present paper deals with some structural properties of transportation cost spaces, also known as Arens-Eells spaces, Lipschitz-free spaces and Wasserstein spaces. The main results of this work are: (1) A necessary and sufficient condition on an infinite metric space M, under which the transportation cost space on M contains an isometric copy of 1. The obtained condition is applied to answer the open questions asked by C\'uth and Johanis (2017) concerning several specific metric spaces. (2) The description of the transportation cost space of a weighted finite graph G as the quotient 1(E(G))/Z(G), where E(G) is the edge set and Z(G) is the cycle space of G. This is a generalization of the previously known result to the case of any finite metric space.