A dimension-free interpolation of Caffarelli's contraction theorem

Abstract

We prove global Lipschitz estimates for Brenier maps between probability measures on Rn whose densities belong to the family ρU,\,p=ZU,\, p-1(-Θp(U)), Θp(t)=p(1+tp), p∈[n,+∞], with finite normalization constant ZU,\, p, and with the convention Θ∞(t)=t. We allow different parameters for source and target, d,D∈[n,+∞], with d D. Our global estimate is uniform in n,d,D, and in the case d=D<+∞, it improves the bounds of arXiv:2404.05456 by removing their exponential dependence on the dimension. We also prove localized estimates inside fixed balls BR whose constants are stable under the limits d,D+∞ and they allow us to recover Caffarelli's celebrated contraction theorem with sharp constants.