theorems:gauss_bonnet
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theorems:gauss_bonnet [2017/11/20 17:48] jakobadmin [Why is it interesting?] |
theorems:gauss_bonnet [2018/03/28 15:25] (current) jakobadmin |
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| ====== Gauss-Bonnet Theorem ====== | ====== Gauss-Bonnet Theorem ====== | ||
| - | <tabbox Why is it interesting?> | + | |
| - | The Gauss-Bonnet theorem is a formula that yields a topological invariant, i.e. something that can be used to characterise e.g. manifolds. | + | <tabbox Intuitive> |
| - | <tabbox Layman> | + | |
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| - | <tabbox Student> | + | <tabbox Concrete> |
| * [[https://www.physicsforums.com/attachments/preliminaries-moore-pdf.20344/|A fantastic introduction that explains the Gauss-Bonnet theorem in intuitive terms is Geometry and topology in many-particle systems]] by Joel E. Moore | * [[https://www.physicsforums.com/attachments/preliminaries-moore-pdf.20344/|A fantastic introduction that explains the Gauss-Bonnet theorem in intuitive terms is Geometry and topology in many-particle systems]] by Joel E. Moore | ||
| - | <tabbox Researcher> | + | <tabbox Abstract> |
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| - | <tabbox Examples> | + | <tabbox Why is it interesting?> |
| - | + | The Gauss-Bonnet theorem is a formula that yields a topological invariant, i.e. something that can be used to characterise e.g. manifolds. | |
| - | --> Example1# | + | |
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| - | <tabbox FAQ> | + | |
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| - | <tabbox History> | + | |
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theorems/gauss_bonnet.1511196497.txt.gz · Last modified: 2017/12/04 08:01 (external edit)
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