Generalized curvature for the optimal transport problem induced by a Tonelli Lagrangian
Abstract: We propose a generalized curvature that is motivated by the optimal transport problem on $\mathbb{R}d$ with cost induced by a Tonelli Lagrangian $L$. We show that non-negativity of the generalized curvature implies displacement convexity of the generalized entropy functional on the $L-$Wasserstein space along $C2$ displacement interpolants.
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