Elation generalized quadrangles of order (q, q 2), q even, with a classical subquadrangle of order q
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Publication:5479749
DOI10.1515/ADVGEOM.2006.015zbMath1100.51003OpenAlexW2094543272MaRDI QIDQ5479749
Publication date: 11 July 2006
Published in: advg (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1515/advgeom.2006.015
Finite automorphism groups of algebraic, geometric, or combinatorial structures (20B25) Generalized quadrangles and generalized polygons in finite geometry (51E12) Combinatorial structures in finite projective spaces (51E20)
Cites Work
- Normality in a Kantor family
- Eggs in PG(\(4n-1,q\)), \(q\) even, containing a pseudo-pointed conic
- Notes on elation generalized quadrangles.
- A theorem concerning nets arising from generalized quadrangles with a regular point
- On the structure of generalized quadrangles
- Foundations of elation generalized quadrangles
- Ovoids of PG(3,q ), q Even, with a Conic Section
- EGGS IN ${\rm PG}(4n - 1, q), q$ EVEN, CONTAINING A PSEUDO-CONIC
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