A quantitative analysis of metrics on $\mathbf{R}^n$ with almost   constant positive scalar curvature, with applications to fast diffusion flows

Giulio Ciraolo; Alessio Figalli; Francesco Maggi

arXiv:1602.01916·math.AP·December 6, 2016

A quantitative analysis of metrics on $\mathbf{R}^n$ with almost constant positive scalar curvature, with applications to fast diffusion flows

Giulio Ciraolo, Alessio Figalli, Francesco Maggi

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Abstract

We prove a quantitative structure theorem for metrics on $R^{n}$ 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 $R^{n}$ related to the Yamabe flow.

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TopicsGeometric Analysis and Curvature Flows · Geometry and complex manifolds · Mathematical Dynamics and Fractals