On open flat sets in spaces with bipolar comparison
classification
🧮 math.DG
keywords
bipolarcomparisonflatopenalexandrovcomparisonsdroppedholds
read the original abstract
We show that if a Riemannian manifold satisfies (3,3)-bipolar comparisons and has an open flat subset then it is flat. The same holds for a version of MTW where the perpendicularity is dropped. In particular we get that the (3,3)-bipolar comparison is strictly stronger than the Alexandrov comparison.
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