Finite projective planes of order \(n\) with a 2-transitive orbit of length \(n/2-1\). (Q2378031)
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| Language | Label | Description | Also known as |
|---|---|---|---|
| English | Finite projective planes of order \(n\) with a 2-transitive orbit of length \(n/2-1\). |
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Finite projective planes of order \(n\) with a 2-transitive orbit of length \(n/2-1\). (English)
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5 January 2009
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Let \(\Pi\) be a finite projective plane of order \(n\) with a collineation group \(G\) which is doubly transitive on some orbit of size \(n/2 -1\). The author proves that \(n=16\); moreover, \(G\) has a normal subgroup \(\text{PSL}(2,7)\) and \(\Pi\) is the desarguesian plane or the Johnson-Walker translation plane or its dual, or \(|G|=42\) and \(\Pi\) is an unknown plane of order 16.
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finite projective plane
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collineation group
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