Geometric characterization of the sporadic groups \(Fi_{22}\), \(Fi_{23}\), and \(Fi_{24}\) (Q1336442)
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scientific article; zbMATH DE number 665828
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | Geometric characterization of the sporadic groups \(Fi_{22}\), \(Fi_{23}\), and \(Fi_{24}\) |
scientific article; zbMATH DE number 665828 |
Statements
Geometric characterization of the sporadic groups \(Fi_{22}\), \(Fi_{23}\), and \(Fi_{24}\) (English)
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22 November 1994
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A graph \(\Gamma\) is locally \(\Delta\) if for each vertex \(x\) of \(\Gamma\) the neighbors of \(x\) form a subgraph isomorphic to the graph \(\Delta\). A characterization theorem for graphs that are locally the 3-transposition graphs of Fisher's sporadic groups \(Fi_{21}, \dots, Fi_{24}\), is proved.
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characterization theorem
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sporadic groups
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0.8823179
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0.88044846
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0.87499464
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0.87420106
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0.87161565
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0.8695885
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