Non-negative Ollivier curvature on graphs, reverse Poincar\'e inequality, Buser inequality, Liouville property, Harnack inequality and eigenvalue estimates

Abstract

We prove that for combinatorial graphs with non-negative Ollivier curvature, one has \[ \|Pt μ - Pt \|1 ≤ W1(μ,)t \] for all probability measures μ, where Pt is the heat semigroup and W1 is the 1-Wasserstein distance. This turns out to be an equivalent formulation of a version of reverse Poincar\'e inequality. Furthermore, this estimate allows us to prove Buser inequality, Liouville property and the the eigenvalue estimate λ1 ≥ (2)/diam2.