L1-distortion of Wasserstein metrics: a tale of two dimensions

Abstract

By discretizing an argument of Kislyakov, Naor and Schechtman proved that the 1-Wasserstein metric over the planar grid \0,1,… n\2 has L1-distortion bounded below by a constant multiple of n. We provide a new "dimensionality" interpretation of Kislyakov's argument, showing that, if \Gn\n=1∞ is a sequence of graphs whose isoperimetric dimension and Lipschitz-spectral dimension equal a common number δ ∈ [2,∞), then the 1-Wasserstein metric over Gn has L1-distortion bounded below by a constant multiple of ( |Gn|)1δ. We proceed to compute these dimensions for -powers of certain graphs. In particular, we get that the sequence of diamond graphs \Dn\n=1∞ has isoperimetric dimension and Lipschitz-spectral dimension equal to 2, obtaining as a corollary that the 1-Wasserstein metric over Dn has L1-distortion bounded below by a constant multiple of | Dn|. This answers a question of Dilworth, Kutzarova, and Ostrovskii and exhibits only the third sequence of L1-embeddable graphs whose sequence of 1-Wasserstein metrics is not L1-embeddable.