On a Kantorovich-Rubinstein inequality

Abstract

An easy consequence of Kantorovich-Rubinstein duality is the following: if f:[0,1]d → ∞ is Lipschitz and \x1, …, xN \ ⊂ [0,1]d, then | ∫[0,1]d f(x) dx - 1N Σk=1Nf(xk) | ≤ \| ∇ f \|L∞ · W1( 1N Σk=1Nδxk , dx), where W1 denotes the 1-Wasserstein (or Earth Mover's) Distance. We prove another such inequality with a smaller norm on ∇ f and a larger Wasserstein distance. Our inequality is sharp when the points are very regular, i.e. W∞ N-1/d. This prompts the question whether these two inequalities are specific instances of an entire underlying family of estimates capturing a duality between transport distance and function space.