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Scalar curvature rigidity and Ricci Deturck flow on perturbations of Euclidean Space

Published 7 Nov 2016 in math.DG | (1611.01902v2)

Abstract: We prove a rigidity result for non-negative scalar curvature perturbations of the Euclidean metric on $\mathbb{Rn}$ , which may be regarded as a weak version of the rigidity statement of the positive mass theorem. We prove our result by analyzing long time solutions of Ricci DeTurck flow. As a byproduct in doing so, we extend known $Lp$ bounds and decay rates for Ricci DeTurck flow and prove regularity of the flow at the initial data.

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