| Display title | Almost flat manifold |
| Default sort key | Almost flat manifold |
| Page length (in bytes) | 2,710 |
| Namespace ID | 0 |
| Page ID | 205362 |
| Page content language | en - English |
| Page content model | wikitext |
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| Page creator | imported>Ohm |
| Date of page creation | 20:15, 6 March 2023 |
| Latest editor | imported>Ohm |
| Date of latest edit | 20:15, 6 March 2023 |
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Description | Content |
Article description: (description)
This attribute controls the content of the description and og:description elements. | In mathematics, a smooth compact manifold M is called almost flat if for any $ \varepsilon >0 $ there is a Riemannian metric $ g_{\varepsilon } $ on M such that $ {\mbox{diam}}(M,g_{\varepsilon })\leq 1 $ and
$ g_{\varepsilon } $ is $ \varepsilon $-flat, i.e. for the sectional curvature of $ K_ |
