The negative gradient flow for the \(L^2\)-integral of Ricci curvature (Q1401485)
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scientific article; zbMATH DE number 1965481
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | The negative gradient flow for the \(L^2\)-integral of Ricci curvature |
scientific article; zbMATH DE number 1965481 |
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The negative gradient flow for the \(L^2\)-integral of Ricci curvature (English)
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17 August 2003
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The author introduces the negative gradient flow for the \(L^2\)-integral of the Ricci curvature and proves the short time existence. In dimension 3, the author also proves that (1) if the maximal time interval \([0, T)\) of existence of solution is infinite, the solution \(g(t)\) converges to a flat metric, and (2) if the interval is finite, then as \(t\rightarrow T\), either the curvature is unbounded or the manifold collapses.
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negative gradient flow
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short time existence
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time interval
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flat metric
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