A quantitative analysis of metrics on Rn with almost constant positive scalar curvature, with applications to fast diffusion flows
Abstract
We prove a quantitative structure theorem for metrics on Rn that are conformal to the flat metric, have almost constant positive scalar curvature, and cannot concentrate more than one bubble. As an application of our result, we show a quantitative rate of convergence in relative entropy for a fast diffusion equation in Rn related to the Yamabe flow.
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