Markov Type constants, flat tori and Wasserstein spaces

Abstract

Let Mp(X,T) denote the Markov type p constant at time T of a metric space X, where p 1. We show that Mp(Y,T) Mp(X,T) in each of the following cases: (a)X and Y are geodesic spaces and Y is covered by X via a finite-sheeted locally isometric covering, (b)Y is the quotient of X by a finite group of isometries, (c) Y is the Lp-Wasserstein space over X. As an application of (a) we show that all compact flat manifolds have Markov type 2 with constant 1. In particular the circle with its intrinsic metric has Markov type 2 with constant 1. This answers the question raised by S.-I. Ohta and M. Pichot. Parts (b) and (c) imply new upper bounds for Markov type constants of the Lp-Wasserstein space over Rd. These bounds were conjectured by A. Andoni, A. Naor and O. Neiman. They imply certain restrictions on bi-Lipschitz embeddability of snowflakes into such Wasserstein spaces.