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A note on conformal
Ricci flow
Peng Lu, Jie Qing and Yu Zheng |
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Vol. 268 (2014), No. 2, 413–434
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Abstract |
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In this note we study the conformal Ricci flow that Arthur Fischer introduced in 2004. We use DeTurck’s trick to rewrite the conformal Ricci flow as a strong parabolic-elliptic partial differential equation. Then we prove short-time existence for the conformal Ricci flow on compact manifolds as well as on asymptotically flat manifolds. We show that the Yamabe constant is monotonically increasing along conformal Ricci flow on compact manifolds. We also show that the conformal Ricci flow is the gradient flow for the ADM mass on asymptotically flat manifolds. |
Keywords
conformal Ricci flow, short-time existence, asymptotically
flat manifolds, ADM mass
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Mathematical Subject Classification 2010
Primary: 53C25
Secondary: 58J05
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Milestones
Received: 20 April 2012
Accepted: 7 May 2012
Published: 21 June 2014
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Authors |
| Peng Lu | |
| Department of Mathematics University of Oregon 304 Deady Hall Eugene, OR 97403 United States |
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| http://pages.uoregon.edu/penglu/ | |
| Jie Qing | |
| Department of Mathematics University of California, Santa Cruz McHenry 4178 Santa Cruz, CA 95064 United States |
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| http://www.math.ucsc.edu/faculty/qing.html | |
| Yu Zheng | |
| Department of Mathematics Shanghai Key Laboratory of PMMP East China Normal University Dongchuan RD 500 Shanghai 200241 China |
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