A local gap theorem for Ricci shrinkers

Abstract

We prove a local gap theorem for Ricci shrinkers, which states that if the local μ-functional at scale 1 on a large ball centered at the minimum point of the potential function is close enough to 0, then the shrinker must be the flat gaussian shrinker. In relation to our result, Yokota [Yo09,Yo12] proved the same result assuming the global μ-functional to be close enough to 0. Our result shows an aspect of how the local geometry of a shrinker controls the global geometry, which is also discussed in [LW19,LW20,LW21].

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