Volume growth, curvature decay, and critical metrics
classification
🧮 math.DG
math.AP
keywords
growthvolumeassumptionfirstpreviousresultstheoremallow
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We make some improvements to our previous results. First, we prove a version of our volume growth theorem which does not require any assumption on the first Betti number. Second, we show that our local regularity theorem only requires a lower volume growth assumption, not a full Sobolev constant bound. These results allow us to weaken the assumptions of our previous volume growth and convergence theorems.
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Cited by 1 Pith paper
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A Gap Theorem for Half-Conformally Flat Manifolds
Compact half-conformally flat manifolds of negative type with bounded L2 energy, small scalar curvature, and non-collapsing have bounded Betti numbers; related singularity models are 2-ended and asymptotically Kähler,...
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