Examples of CD(0,N) spaces with non-constant dimension

Abstract

In this work, we generalize the results obtained in (J. Geom. Anal., 32(6):Paper No.173, 32, 2022), presenting some examples of CD(0,N) spaces having different dimensions in different regions, deducing in particular that the topological splitting may fail in CD(0,N) spaces. We also observe that any reasonable non-branching condition may fail in CD(0,N) spaces and that the existence of an optimal transport map, between two absolutely continuous marginals, is not guaranteed by the CD(0,N) condition, without requiring a non-branching assumption. Moreover, we show that the strict CD(0,N) condition is strictly stronger than the classical CD(0,N) one and it is not stable with respect to the measured Gromov-Hausdorff convergence.

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