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Certain Roman and flock generalized quadrangles have nonisomorphic elation groups
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G Havas
,
C. R Leedham-Green
Published/Copyright:
August 10, 2006
Abstract
We prove that the elation groups of a certain infinite family of Roman generalized quadrangles are not isomorphic to those of associated flock generalized quadrangles.
Received: 2004-11-17
Published Online: 2006-08-10
Published in Print: 2006-07-01
© Walter de Gruyter
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- A classification of 4-dimensional elation Laguerre planes of group dimension 10
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- Symmetry and the farthest point mapping on convex surfaces
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Articles in the same Issue
- On the surjectivity of the canonical Gaussian map for multiple coverings
- A classification of 4-dimensional elation Laguerre planes of group dimension 10
- Completely regular ovals
- Symmetry and the farthest point mapping on convex surfaces
- Certain Roman and flock generalized quadrangles have nonisomorphic elation groups
- Similarity structures on the torus and the Klein bottle via triangulations
- On Euclidean designs
- Carnot spaces and the k-stein condition
- Simplicity of the universal quotient bundle restricted to congruences of lines in ℙ3
- Entropy of the geodesic flow for metric spaces and Bruhat–Tits buildings
