A relation between isoperimetry and total variation decay with applications to graphs of non-negative Ollivier-Ricci curvature

Abstract

We prove an inequality relating the isoperimetric profile of a graph to the decay of the random walk total variation distance x y ||Pn(x,·)-Pn(y,·)||TV. This inequality implies a quantitative version of a theorem of Salez (GAFA 2022) stating that bounded-degree graphs of non-negative Ollivier-Ricci curvature cannot be expanders. Along the way, we prove universal upper-tail estimates for the random walk displacement d(X0,Xn) and information - Pn(X0,Xn), which may be of independent interest.

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