Generalized quadrangles constructed from topological Laguerre planes (Q1801616)
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scientific article; zbMATH DE number 205518
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | Generalized quadrangles constructed from topological Laguerre planes |
scientific article; zbMATH DE number 205518 |
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Generalized quadrangles constructed from topological Laguerre planes (English)
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17 August 1993
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The Lie geometry \(L(E)\) of a Laguerre geometry \(E\) is formed from the points of circles of \(E\) plus a point at infinity. It is shown here that, if \(E\) is finite-dimensional, locally compact and connected, in a certain topology, then \(L(E)\) is a generalized quadrangle with the topology attached.
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topological quadrangle
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Laguerre geometry
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0.92031276
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0.91744155
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0.91644704
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0.90774095
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0.9041504
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