(K,N)-convexity and the curvature-dimension condition for negative N
Abstract
We extend the range of N to negative values in the (K,N)-convexity (in the sense of Erbar--Kuwada--Sturm), the weighted Ricci curvature RicN and the curvature-dimension condition CD(K,N). We generalize a number of results in the case of N>0 to this setting, including Bochner's inequality, the Brunn--Minkowski inequality and the equivalence between RicN K and CD(K,N). We also show an expansion bound for gradient flows of Lipschitz (K,N)-convex functions.
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