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ADM mass for $C^0$ metrics and distortion under Ricci-DeTurck flow (2208.14550v3)
Published 30 Aug 2022 in math.DG
Abstract: We show that there exists a quantity, depending only on $C0$ data of a Riemannian metric, that agrees with the usual ADM mass at infinity whenever the ADM mass exists, but has a well-defined limit at infinity for any continuous Riemannian metric that is asymptotically flat in the $C0$ sense and has nonnegative scalar curvature in the sense of Ricci flow. Moreover, the $C0$ mass at infinity is independent of choice of $C0$-asymptotically flat coordinate chart, and the $C0$ local mass has controlled distortion under Ricci-DeTurck flow when coupled with a suitably evolving test function.
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